TY  - THES
AU  - Jeremić, Bojan
PY  - 2020
UR  - http://eteze.bg.ac.rs/application/showtheses?thesesId=8071
UR  - https://fedorabg.bg.ac.rs/fedora/get/o:23539/bdef:Content/download
UR  - http://vbs.rs/scripts/cobiss?command=DISPLAY&base=70036&RID=27863561
UR  - https://nardus.mpn.gov.rs/handle/123456789/18260
UR  - https://machinery.mas.bg.ac.rs/handle/123456789/4035
AB  - У овој докторској дисертацији уопштење класичног проблемабрахистохроног кретања материјалне тачке у вертикалној равни, чије се кретањереализује идеалном везом без активних управљачких сила, односи се нахолономне и нехолономне механичке системе у оквиру којих постоје и тачкепроменљиве масе. Брахистохроно кретање реализује се, у складу са класичнимбрахистохроним проблемом, без активних управљачких сила. Улогу управљањапреузимају реакције идеалних веза, где треба имати у виду да је снагауправљачких сила током брахистохроног кретања једнака нули...
AB  - In this doctoral dissertation, the generalization of the classical problem ofbrachistochronic motion of the particle in a vertical plane, whose motion is realized byan ideal constraint without active control forces, refers to holonomic and nonholonomicmechanical systems within which there are also variable mass particles. Thebrachistochronic motion is realized in accordance with the classical brachistochroneproblem, without active control forces. The role of control is assumedby the reactions ofideal constraints, where one should bear in mind that the power of the control forcesduring brachistochronic motion is equal to zero...
PB  - Универзитет у Београду, Машински факултет
T2  - Универзитет у Београду
T1  - Реализација брахистохроног кретања механичких система променљиве масе идеалним везама са ограниченим реакцијама
UR  - https://hdl.handle.net/21.15107/rcub_nardus_18260
ER  - 

@phdthesis{
author = "Jeremić, Bojan",
year = "2020",
abstract = "У овој докторској дисертацији уопштење класичног проблемабрахистохроног кретања материјалне тачке у вертикалној равни, чије се кретањереализује идеалном везом без активних управљачких сила, односи се нахолономне и нехолономне механичке системе у оквиру којих постоје и тачкепроменљиве масе. Брахистохроно кретање реализује се, у складу са класичнимбрахистохроним проблемом, без активних управљачких сила. Улогу управљањапреузимају реакције идеалних веза, где треба имати у виду да је снагауправљачких сила током брахистохроног кретања једнака нули..., In this doctoral dissertation, the generalization of the classical problem ofbrachistochronic motion of the particle in a vertical plane, whose motion is realized byan ideal constraint without active control forces, refers to holonomic and nonholonomicmechanical systems within which there are also variable mass particles. Thebrachistochronic motion is realized in accordance with the classical brachistochroneproblem, without active control forces. The role of control is assumedby the reactions ofideal constraints, where one should bear in mind that the power of the control forcesduring brachistochronic motion is equal to zero...",
publisher = "Универзитет у Београду, Машински факултет",
journal = "Универзитет у Београду",
title = "Реализација брахистохроног кретања механичких система променљиве масе идеалним везама са ограниченим реакцијама",
url = "https://hdl.handle.net/21.15107/rcub_nardus_18260"
}

Jeremić, B.. (2020). Реализација брахистохроног кретања механичких система променљиве масе идеалним везама са ограниченим реакцијама. in Универзитет у Београду
Универзитет у Београду, Машински факултет..
https://hdl.handle.net/21.15107/rcub_nardus_18260

Jeremić B. Реализација брахистохроног кретања механичких система променљиве масе идеалним везама са ограниченим реакцијама. in Универзитет у Београду. 2020;.
https://hdl.handle.net/21.15107/rcub_nardus_18260 .

Jeremić, Bojan, "Реализација брахистохроног кретања механичких система променљиве масе идеалним везама са ограниченим реакцијама" in Универзитет у Београду (2020),
https://hdl.handle.net/21.15107/rcub_nardus_18260 .

TY  - JOUR
AU  - Jeremić, Bojan
AU  - Radulović, Radoslav
AU  - Zorić, Nemanja
AU  - Dražić, Milan
PY  - 2019
UR  - https://machinery.mas.bg.ac.rs/handle/123456789/2997
AB  - The paper considers realization of the brachistochronic motion of a nonholonomic mechanical system, composed of variable mass particles, by means of an ideal holonomic constraint with restricted reaction. It is assumed that the system performs planar motion in an arbitrary field of forces and that it has two degrees of freedom. In addition, the laws of the time-rate of mass variation of the particles, as well as relative velocities of the expelled and gained particles, respectively, are known. Restricted reaction of the holonomic constraint is taken for the scalar control. Applying Pontryagin's maximum principle and singular optimal control theory, the problem of brachistochronic motion is solved as a two-point boundary value problem (TPBVP). Since the reaction of the constraint is restricted, different types of control structures are examined, from singular to totally nonsingular. The considerations are illustrated via an example.
PB  - Univerzitet u Nišu - Prirodno-matematički fakultet - Departmant za matematiku i informatiku, Niš
T2  - Filomat
T1  - Realizing Brachistochronic Planar Motion of a Variable Mass Nonholonomic Mechanical System by an Ideal Holonomic Constraint with Restricted Reaction
EP  - 4401
IS  - 14
SP  - 4387
VL  - 33
DO  - 10.2298/FIL1914387J
ER  - 

@article{
author = "Jeremić, Bojan and Radulović, Radoslav and Zorić, Nemanja and Dražić, Milan",
year = "2019",
abstract = "The paper considers realization of the brachistochronic motion of a nonholonomic mechanical system, composed of variable mass particles, by means of an ideal holonomic constraint with restricted reaction. It is assumed that the system performs planar motion in an arbitrary field of forces and that it has two degrees of freedom. In addition, the laws of the time-rate of mass variation of the particles, as well as relative velocities of the expelled and gained particles, respectively, are known. Restricted reaction of the holonomic constraint is taken for the scalar control. Applying Pontryagin's maximum principle and singular optimal control theory, the problem of brachistochronic motion is solved as a two-point boundary value problem (TPBVP). Since the reaction of the constraint is restricted, different types of control structures are examined, from singular to totally nonsingular. The considerations are illustrated via an example.",
publisher = "Univerzitet u Nišu - Prirodno-matematički fakultet - Departmant za matematiku i informatiku, Niš",
journal = "Filomat",
title = "Realizing Brachistochronic Planar Motion of a Variable Mass Nonholonomic Mechanical System by an Ideal Holonomic Constraint with Restricted Reaction",
pages = "4401-4387",
number = "14",
volume = "33",
doi = "10.2298/FIL1914387J"
}

Jeremić, B., Radulović, R., Zorić, N.,& Dražić, M.. (2019). Realizing Brachistochronic Planar Motion of a Variable Mass Nonholonomic Mechanical System by an Ideal Holonomic Constraint with Restricted Reaction. in Filomat
Univerzitet u Nišu - Prirodno-matematički fakultet - Departmant za matematiku i informatiku, Niš., 33(14), 4387-4401.
https://doi.org/10.2298/FIL1914387J

Jeremić B, Radulović R, Zorić N, Dražić M. Realizing Brachistochronic Planar Motion of a Variable Mass Nonholonomic Mechanical System by an Ideal Holonomic Constraint with Restricted Reaction. in Filomat. 2019;33(14):4387-4401.
doi:10.2298/FIL1914387J .

Jeremić, Bojan, Radulović, Radoslav, Zorić, Nemanja, Dražić, Milan, "Realizing Brachistochronic Planar Motion of a Variable Mass Nonholonomic Mechanical System by an Ideal Holonomic Constraint with Restricted Reaction" in Filomat, 33, no. 14 (2019):4387-4401,
https://doi.org/10.2298/FIL1914387J . .

TY  - CONF
AU  - Radulović, Radoslav
AU  - Jeremić, Bojan
AU  - Obradović, Aleksandar
PY  - 2019
UR  - https://machinery.mas.bg.ac.rs/handle/123456789/4034
AB  - The paper considers realization of the brachistochronic motion of a nonholonomic
mechanical system, composed of variable mass particles, by means of an ideal holonomic
constraint. It is assumed that the system performs planar motion in an arbitrary field of forces
and that it has two degrees of freedom. In addition, the laws of the time-rate of mass variation of
the particles, as well as relative velocities of the expelled and gained particles, respectively, are
known. The first time-derivative of quasi-velocity is taken as control variable. Applying
Pontryagin's maximum principle and singular optimal control theory, the problem of
brachistochronic motion is solved as a two-point boundary value problem (TPBVP). The
considerations are illustrated via an example.
PB  - Srpsko društvo za mehaniku
C3  - Proceeding of 7th International Congress of Serbian Society of Mechanics Sremski Karlovci, Serbia, June 24-26, 2019
T1  - Realization of the brachistohronic motion of a nonholonomic variable mass mechanical system by ideal holonomic constraint
SP  - M1i
UR  - https://hdl.handle.net/21.15107/rcub_machinery_4034
ER  - 

@conference{
author = "Radulović, Radoslav and Jeremić, Bojan and Obradović, Aleksandar",
year = "2019",
abstract = "The paper considers realization of the brachistochronic motion of a nonholonomic
mechanical system, composed of variable mass particles, by means of an ideal holonomic
constraint. It is assumed that the system performs planar motion in an arbitrary field of forces
and that it has two degrees of freedom. In addition, the laws of the time-rate of mass variation of
the particles, as well as relative velocities of the expelled and gained particles, respectively, are
known. The first time-derivative of quasi-velocity is taken as control variable. Applying
Pontryagin's maximum principle and singular optimal control theory, the problem of
brachistochronic motion is solved as a two-point boundary value problem (TPBVP). The
considerations are illustrated via an example.",
publisher = "Srpsko društvo za mehaniku",
journal = "Proceeding of 7th International Congress of Serbian Society of Mechanics Sremski Karlovci, Serbia, June 24-26, 2019",
title = "Realization of the brachistohronic motion of a nonholonomic variable mass mechanical system by ideal holonomic constraint",
pages = "M1i",
url = "https://hdl.handle.net/21.15107/rcub_machinery_4034"
}

Radulović, R., Jeremić, B.,& Obradović, A.. (2019). Realization of the brachistohronic motion of a nonholonomic variable mass mechanical system by ideal holonomic constraint. in Proceeding of 7th International Congress of Serbian Society of Mechanics Sremski Karlovci, Serbia, June 24-26, 2019
Srpsko društvo za mehaniku., M1i.
https://hdl.handle.net/21.15107/rcub_machinery_4034

Radulović R, Jeremić B, Obradović A. Realization of the brachistohronic motion of a nonholonomic variable mass mechanical system by ideal holonomic constraint. in Proceeding of 7th International Congress of Serbian Society of Mechanics Sremski Karlovci, Serbia, June 24-26, 2019. 2019;:M1i.
https://hdl.handle.net/21.15107/rcub_machinery_4034 .

Radulović, Radoslav, Jeremić, Bojan, Obradović, Aleksandar, "Realization of the brachistohronic motion of a nonholonomic variable mass mechanical system by ideal holonomic constraint" in Proceeding of 7th International Congress of Serbian Society of Mechanics Sremski Karlovci, Serbia, June 24-26, 2019 (2019):M1i,
https://hdl.handle.net/21.15107/rcub_machinery_4034 .

TY  - CONF
AU  - Jeremić, Bojan
AU  - Radulović, Radoslav
AU  - Obradović, Aleksandar
PY  - 2019
UR  - https://machinery.mas.bg.ac.rs/handle/123456789/4033
AB  - The paper considers realization of the brachistochronic motion of a mechanical system,
composed of free body and variable mass material points, by means of an ideal constraint in the
form of the centrodes. It is assumed that the system performs planar motion in an arbitrary field
of forces and that it has three degrees of freedom. In addition, the laws of the time-rate of mass
variation of the material points, as well as relative velocities of the expelled particles,
respectively, are known. Constraint reactions of the centrodes are expressed in the function of the
generalized forces. Applying Pontryagin's maximum principle and singular optimal control
theory, the problem of brachistochronic motion is solved as a two-point boundary value problem
(TPBVP). The considerations are illustrated via an example, where it is examined how the change
in the initial energy of the system affects the normal reaction of the connection and thus the
coefficient of rolling friction.
PB  - Srpsko društvo za mehaniku
C3  - Proceeding of 7th International Congress of Serbian Society of Mechanics Sremski Karlovci, Serbia, June 24-26, 2019
T1  - Realizing brachistohronic motion of a variable mass body by centrodes
SP  - G3a
UR  - https://hdl.handle.net/21.15107/rcub_machinery_4033
ER  - 

@conference{
author = "Jeremić, Bojan and Radulović, Radoslav and Obradović, Aleksandar",
year = "2019",
abstract = "The paper considers realization of the brachistochronic motion of a mechanical system,
composed of free body and variable mass material points, by means of an ideal constraint in the
form of the centrodes. It is assumed that the system performs planar motion in an arbitrary field
of forces and that it has three degrees of freedom. In addition, the laws of the time-rate of mass
variation of the material points, as well as relative velocities of the expelled particles,
respectively, are known. Constraint reactions of the centrodes are expressed in the function of the
generalized forces. Applying Pontryagin's maximum principle and singular optimal control
theory, the problem of brachistochronic motion is solved as a two-point boundary value problem
(TPBVP). The considerations are illustrated via an example, where it is examined how the change
in the initial energy of the system affects the normal reaction of the connection and thus the
coefficient of rolling friction.",
publisher = "Srpsko društvo za mehaniku",
journal = "Proceeding of 7th International Congress of Serbian Society of Mechanics Sremski Karlovci, Serbia, June 24-26, 2019",
title = "Realizing brachistohronic motion of a variable mass body by centrodes",
pages = "G3a",
url = "https://hdl.handle.net/21.15107/rcub_machinery_4033"
}

Jeremić, B., Radulović, R.,& Obradović, A.. (2019). Realizing brachistohronic motion of a variable mass body by centrodes. in Proceeding of 7th International Congress of Serbian Society of Mechanics Sremski Karlovci, Serbia, June 24-26, 2019
Srpsko društvo za mehaniku., G3a.
https://hdl.handle.net/21.15107/rcub_machinery_4033

Jeremić B, Radulović R, Obradović A. Realizing brachistohronic motion of a variable mass body by centrodes. in Proceeding of 7th International Congress of Serbian Society of Mechanics Sremski Karlovci, Serbia, June 24-26, 2019. 2019;:G3a.
https://hdl.handle.net/21.15107/rcub_machinery_4033 .

Jeremić, Bojan, Radulović, Radoslav, Obradović, Aleksandar, "Realizing brachistohronic motion of a variable mass body by centrodes" in Proceeding of 7th International Congress of Serbian Society of Mechanics Sremski Karlovci, Serbia, June 24-26, 2019 (2019):G3a,
https://hdl.handle.net/21.15107/rcub_machinery_4033 .

TY  - JOUR
AU  - Jeremić, Bojan
AU  - Radulović, Radoslav
AU  - Obradović, Aleksandar
AU  - Šalinić, Slaviša
AU  - Dražić, Milan
PY  - 2019
UR  - https://machinery.mas.bg.ac.rs/handle/123456789/3045
AB  - In this paper, the brachistochronic motion of a mechanical system composed of variable-mass particles is analysed. Workless (ideal) holonomic and linear nonholonomic constraints are imposed on the system. It is assumed that the system moves in an arbitrary field of known potential and nonpotential forces with prescribed both laws of the time-rate of mass variation of the particles and relative velocities of the expelled (or gained) masses. The first time-derivatives of quasi-velocities are taken as control variables. Using Pontryagin's maximum principle and singular optimal control theory, the problem of brachistochronic motion of the nonholonomic variable-mass mechanical system is solved as a two-point boundary value problem. In addition, a discussion about the realization of control forces is given. The results are illustrated via an example.
PB  - Sage Publications Ltd, London
T2  - Mathematics and Mechanics of Solids
T1  - Brachistochronic motion of a nonholonomic variable-mass mechanical system in general force fields
EP  - 298
IS  - 1
SP  - 281
VL  - 24
DO  - 10.1177/1081286517738307
ER  - 

@article{
author = "Jeremić, Bojan and Radulović, Radoslav and Obradović, Aleksandar and Šalinić, Slaviša and Dražić, Milan",
year = "2019",
abstract = "In this paper, the brachistochronic motion of a mechanical system composed of variable-mass particles is analysed. Workless (ideal) holonomic and linear nonholonomic constraints are imposed on the system. It is assumed that the system moves in an arbitrary field of known potential and nonpotential forces with prescribed both laws of the time-rate of mass variation of the particles and relative velocities of the expelled (or gained) masses. The first time-derivatives of quasi-velocities are taken as control variables. Using Pontryagin's maximum principle and singular optimal control theory, the problem of brachistochronic motion of the nonholonomic variable-mass mechanical system is solved as a two-point boundary value problem. In addition, a discussion about the realization of control forces is given. The results are illustrated via an example.",
publisher = "Sage Publications Ltd, London",
journal = "Mathematics and Mechanics of Solids",
title = "Brachistochronic motion of a nonholonomic variable-mass mechanical system in general force fields",
pages = "298-281",
number = "1",
volume = "24",
doi = "10.1177/1081286517738307"
}

Jeremić, B., Radulović, R., Obradović, A., Šalinić, S.,& Dražić, M.. (2019). Brachistochronic motion of a nonholonomic variable-mass mechanical system in general force fields. in Mathematics and Mechanics of Solids
Sage Publications Ltd, London., 24(1), 281-298.
https://doi.org/10.1177/1081286517738307

Jeremić B, Radulović R, Obradović A, Šalinić S, Dražić M. Brachistochronic motion of a nonholonomic variable-mass mechanical system in general force fields. in Mathematics and Mechanics of Solids. 2019;24(1):281-298.
doi:10.1177/1081286517738307 .

Jeremić, Bojan, Radulović, Radoslav, Obradović, Aleksandar, Šalinić, Slaviša, Dražić, Milan, "Brachistochronic motion of a nonholonomic variable-mass mechanical system in general force fields" in Mathematics and Mechanics of Solids, 24, no. 1 (2019):281-298,
https://doi.org/10.1177/1081286517738307 . .

TY  - JOUR
AU  - Radulović, Radoslav
AU  - Jeremić, Bojan
AU  - Šalinić, Slaviša
AU  - Obradović, Aleksandar
AU  - Dražić, Milan
PY  - 2018
UR  - https://machinery.mas.bg.ac.rs/handle/123456789/2931
AB  - We consider the brachistochrone problem of the particle with a preselected interval for the normal reaction force value as well as the terminal position of the particle lying on an arbitrary planar curve. We use optimal control theory to solve the formulated brachistochrone problem. Here we treat the brachistochrone curve as a bilateral ideal constraint. We study the cases of symmetrically and unsymmetrically preselected intervals for the normal reaction force value. We show that in the case of a symmetrically preselected interval for the normal reaction force value, the brachistochrone curve is a two-segment curve, and in the case of an unsymmetrically preselected interval, it is a three-segment curve. We present a numerical procedure for the identification of the global minimum time of motion. Finally, we present several examples to illustrate the approach proposed in the paper.
PB  - Pergamon-Elsevier Science Ltd, Oxford
T2  - International Journal of Non-Linear Mechanics
T1  - A new approach for the determination of the global minimum time for the brachistochrone with preselected interval for the normal reaction force value
EP  - 35
SP  - 26
VL  - 101
DO  - 10.1016/j.ijnonlinmec.2018.02.001
ER  - 

@article{
author = "Radulović, Radoslav and Jeremić, Bojan and Šalinić, Slaviša and Obradović, Aleksandar and Dražić, Milan",
year = "2018",
abstract = "We consider the brachistochrone problem of the particle with a preselected interval for the normal reaction force value as well as the terminal position of the particle lying on an arbitrary planar curve. We use optimal control theory to solve the formulated brachistochrone problem. Here we treat the brachistochrone curve as a bilateral ideal constraint. We study the cases of symmetrically and unsymmetrically preselected intervals for the normal reaction force value. We show that in the case of a symmetrically preselected interval for the normal reaction force value, the brachistochrone curve is a two-segment curve, and in the case of an unsymmetrically preselected interval, it is a three-segment curve. We present a numerical procedure for the identification of the global minimum time of motion. Finally, we present several examples to illustrate the approach proposed in the paper.",
publisher = "Pergamon-Elsevier Science Ltd, Oxford",
journal = "International Journal of Non-Linear Mechanics",
title = "A new approach for the determination of the global minimum time for the brachistochrone with preselected interval for the normal reaction force value",
pages = "35-26",
volume = "101",
doi = "10.1016/j.ijnonlinmec.2018.02.001"
}

Radulović, R., Jeremić, B., Šalinić, S., Obradović, A.,& Dražić, M.. (2018). A new approach for the determination of the global minimum time for the brachistochrone with preselected interval for the normal reaction force value. in International Journal of Non-Linear Mechanics
Pergamon-Elsevier Science Ltd, Oxford., 101, 26-35.
https://doi.org/10.1016/j.ijnonlinmec.2018.02.001

Radulović R, Jeremić B, Šalinić S, Obradović A, Dražić M. A new approach for the determination of the global minimum time for the brachistochrone with preselected interval for the normal reaction force value. in International Journal of Non-Linear Mechanics. 2018;101:26-35.
doi:10.1016/j.ijnonlinmec.2018.02.001 .

Radulović, Radoslav, Jeremić, Bojan, Šalinić, Slaviša, Obradović, Aleksandar, Dražić, Milan, "A new approach for the determination of the global minimum time for the brachistochrone with preselected interval for the normal reaction force value" in International Journal of Non-Linear Mechanics, 101 (2018):26-35,
https://doi.org/10.1016/j.ijnonlinmec.2018.02.001 . .

TY  - CONF
AU  - Radulović, Radoslav
AU  - Jeremić, Bojan
AU  - Obradović, Aleksandar
AU  - Stokić, Zoran
PY  - 2017
UR  - https://machinery.mas.bg.ac.rs/handle/123456789/4054
AB  - The problem of the brachistochronic motion of a particle in space is considered. Particle
М moves in the field of known potential forces. The brachistochrone problem is formulated as an
optimal control task, where the particle velocity projections are taken as control variables. The
problem considered is reduced to solving the corresponding two-point boundary–value problem
(TPBVP).The appropriate numerical procedure to apply in determining the solutions to the
TPBVP is based on the shooting method. The paper presents the procedure for estimating the
interval of initial values of the conjugate vector coordinates. Based on given estimation, it may be
claimed that all solutions to the corresponding TPBVP are certainly located within given
intervals, and thereby the global minimum time too for the brachistochronic motion of a particle.
In the case of multiple solutions of the principle of maximum, the global minimum is the solution
corresponding to the minimum time.
PB  - Beograd : Srpsko društvo za mehaniku
C3  - Proceeding of 6th International Congress of Serbian Society of Mechanics Mountain Tara, Serbia, June 19-21, 2017
T1  - Global minimum time for the brachistohronic motion of a particle in an arbitrary field of potential forces
SP  - G2d
UR  - https://hdl.handle.net/21.15107/rcub_machinery_4054
ER  - 

@conference{
author = "Radulović, Radoslav and Jeremić, Bojan and Obradović, Aleksandar and Stokić, Zoran",
year = "2017",
abstract = "The problem of the brachistochronic motion of a particle in space is considered. Particle
М moves in the field of known potential forces. The brachistochrone problem is formulated as an
optimal control task, where the particle velocity projections are taken as control variables. The
problem considered is reduced to solving the corresponding two-point boundary–value problem
(TPBVP).The appropriate numerical procedure to apply in determining the solutions to the
TPBVP is based on the shooting method. The paper presents the procedure for estimating the
interval of initial values of the conjugate vector coordinates. Based on given estimation, it may be
claimed that all solutions to the corresponding TPBVP are certainly located within given
intervals, and thereby the global minimum time too for the brachistochronic motion of a particle.
In the case of multiple solutions of the principle of maximum, the global minimum is the solution
corresponding to the minimum time.",
publisher = "Beograd : Srpsko društvo za mehaniku",
journal = "Proceeding of 6th International Congress of Serbian Society of Mechanics Mountain Tara, Serbia, June 19-21, 2017",
title = "Global minimum time for the brachistohronic motion of a particle in an arbitrary field of potential forces",
pages = "G2d",
url = "https://hdl.handle.net/21.15107/rcub_machinery_4054"
}

Radulović, R., Jeremić, B., Obradović, A.,& Stokić, Z.. (2017). Global minimum time for the brachistohronic motion of a particle in an arbitrary field of potential forces. in Proceeding of 6th International Congress of Serbian Society of Mechanics Mountain Tara, Serbia, June 19-21, 2017
Beograd : Srpsko društvo za mehaniku., G2d.
https://hdl.handle.net/21.15107/rcub_machinery_4054

Radulović R, Jeremić B, Obradović A, Stokić Z. Global minimum time for the brachistohronic motion of a particle in an arbitrary field of potential forces. in Proceeding of 6th International Congress of Serbian Society of Mechanics Mountain Tara, Serbia, June 19-21, 2017. 2017;:G2d.
https://hdl.handle.net/21.15107/rcub_machinery_4054 .

Radulović, Radoslav, Jeremić, Bojan, Obradović, Aleksandar, Stokić, Zoran, "Global minimum time for the brachistohronic motion of a particle in an arbitrary field of potential forces" in Proceeding of 6th International Congress of Serbian Society of Mechanics Mountain Tara, Serbia, June 19-21, 2017 (2017):G2d,
https://hdl.handle.net/21.15107/rcub_machinery_4054 .

TY  - JOUR
AU  - Jeremić, Bojan
AU  - Radulović, Radoslav
AU  - Obradović, Aleksandar
PY  - 2016
UR  - https://machinery.mas.bg.ac.rs/handle/123456789/2330
AB  - The paper considers the brachistochronic motion of a variable mass nonholonomic mechanical system [3] in a horizontal plane, between two specified positions. Variable mass particles are interconnected by a lightweight mechanism of the 'pitchfork' type. The law of the time-rate of mass variation of the particles, as well as relative velocities of the expelled particles, as a function of time, are known. Differential equations of motion, where the reactions of nonholonomic constraints and control forces figure, are created based on the general theorems of dynamics of a variable mass mechanical system [5]. The formulated brachistochrone problem, with adequately chosen quantities of state, is solved, in this case, as the simplest task of optimal control by applying Pontryagin's maximum principle [1]. A corresponding two-point boundary value problem (TPBVP) of the system of ordinary nonlinear differential equations is obtained, which, in a general case, has to be numerically solved [2]. On the basis of thus obtained brachistochronic motion, the active control forces, along with the reactions of nonholonomic constraints, are determined. The analysis of the brachistochronic motion for different values of the initial position of a variable mass particle B is presented. Also, the interval of values of the initial position of a variable mass particle B, for which there are the TPBVP solutions, is determined.
PB  - Srpsko društvo za mehaniku, Beograd
T2  - Theoretical and Applied Mechanics
T1  - Analysis of the brachistochronic motion of a variable mass nonholonomic mechanical system
EP  - 32
IS  - 1
SP  - 19
VL  - 43
DO  - 10.2298/TAM150723002J
ER  - 

@article{
author = "Jeremić, Bojan and Radulović, Radoslav and Obradović, Aleksandar",
year = "2016",
abstract = "The paper considers the brachistochronic motion of a variable mass nonholonomic mechanical system [3] in a horizontal plane, between two specified positions. Variable mass particles are interconnected by a lightweight mechanism of the 'pitchfork' type. The law of the time-rate of mass variation of the particles, as well as relative velocities of the expelled particles, as a function of time, are known. Differential equations of motion, where the reactions of nonholonomic constraints and control forces figure, are created based on the general theorems of dynamics of a variable mass mechanical system [5]. The formulated brachistochrone problem, with adequately chosen quantities of state, is solved, in this case, as the simplest task of optimal control by applying Pontryagin's maximum principle [1]. A corresponding two-point boundary value problem (TPBVP) of the system of ordinary nonlinear differential equations is obtained, which, in a general case, has to be numerically solved [2]. On the basis of thus obtained brachistochronic motion, the active control forces, along with the reactions of nonholonomic constraints, are determined. The analysis of the brachistochronic motion for different values of the initial position of a variable mass particle B is presented. Also, the interval of values of the initial position of a variable mass particle B, for which there are the TPBVP solutions, is determined.",
publisher = "Srpsko društvo za mehaniku, Beograd",
journal = "Theoretical and Applied Mechanics",
title = "Analysis of the brachistochronic motion of a variable mass nonholonomic mechanical system",
pages = "32-19",
number = "1",
volume = "43",
doi = "10.2298/TAM150723002J"
}

Jeremić, B., Radulović, R.,& Obradović, A.. (2016). Analysis of the brachistochronic motion of a variable mass nonholonomic mechanical system. in Theoretical and Applied Mechanics
Srpsko društvo za mehaniku, Beograd., 43(1), 19-32.
https://doi.org/10.2298/TAM150723002J

Jeremić B, Radulović R, Obradović A. Analysis of the brachistochronic motion of a variable mass nonholonomic mechanical system. in Theoretical and Applied Mechanics. 2016;43(1):19-32.
doi:10.2298/TAM150723002J .

Jeremić, Bojan, Radulović, Radoslav, Obradović, Aleksandar, "Analysis of the brachistochronic motion of a variable mass nonholonomic mechanical system" in Theoretical and Applied Mechanics, 43, no. 1 (2016):19-32,
https://doi.org/10.2298/TAM150723002J . .

TY  - CONF
AU  - Jeremić, Bojan
AU  - Radulović, Radoslav
AU  - Obradović, Aleksandar
PY  - 2015
UR  - https://machinery.mas.bg.ac.rs/handle/123456789/4055
AB  - The paper considers the brachistochronic motion of a variable mass nonholonomic
mechanical system [4] in a horizontal plane, between two specified positions. Variable mass
particles are interconnected by a lightweight mechanism of the ’pitchfork’ type. The law of the
time-rate of mass variation of the particles, as well as relative velocities of the expelled particles,
as a function of time, are known. Differential equations of motion, where the reactions of
nonholonomic constraints and control forces figure, are created based on the general theorems of
dynamics of a variable mass mechanical system [6]. The formulated brachistochrone problem,
with adequately chosen quantities of state, is solved, in this case, as the simplest task of optimal
control by applying Pontryagin’s maximum principle [1]. A corresponding two-point boundary
value problem (TPBVP) of the system of ordinary nonlinear differential equations is obtained,
which, in a general case, has to be numerically solved [2]. Numerical procedure for solving the
TPBVP is performed by the shooting method. On the basis of thus obtained brachistochronic
motion, the active control forces, along with the reactions of nonholonomic constraints, are
determined. The analysis of the brachistochronic motion for different values of the initial position
of a variable mass particle B is presented.
PB  - Srpsko društvo za mehaniku
C3  - Proceeding of 5th International Congress of Serbian Society of Mechanics Arandjelovac, Serbia, June 15-17, 2015
T1  - Brachistohronic motion of a variable mass nonholonomic mechanical system
SP  - G3e
UR  - https://hdl.handle.net/21.15107/rcub_machinery_4055
ER  - 

@conference{
author = "Jeremić, Bojan and Radulović, Radoslav and Obradović, Aleksandar",
year = "2015",
abstract = "The paper considers the brachistochronic motion of a variable mass nonholonomic
mechanical system [4] in a horizontal plane, between two specified positions. Variable mass
particles are interconnected by a lightweight mechanism of the ’pitchfork’ type. The law of the
time-rate of mass variation of the particles, as well as relative velocities of the expelled particles,
as a function of time, are known. Differential equations of motion, where the reactions of
nonholonomic constraints and control forces figure, are created based on the general theorems of
dynamics of a variable mass mechanical system [6]. The formulated brachistochrone problem,
with adequately chosen quantities of state, is solved, in this case, as the simplest task of optimal
control by applying Pontryagin’s maximum principle [1]. A corresponding two-point boundary
value problem (TPBVP) of the system of ordinary nonlinear differential equations is obtained,
which, in a general case, has to be numerically solved [2]. Numerical procedure for solving the
TPBVP is performed by the shooting method. On the basis of thus obtained brachistochronic
motion, the active control forces, along with the reactions of nonholonomic constraints, are
determined. The analysis of the brachistochronic motion for different values of the initial position
of a variable mass particle B is presented.",
publisher = "Srpsko društvo za mehaniku",
journal = "Proceeding of 5th International Congress of Serbian Society of Mechanics Arandjelovac, Serbia, June 15-17, 2015",
title = "Brachistohronic motion of a variable mass nonholonomic mechanical system",
pages = "G3e",
url = "https://hdl.handle.net/21.15107/rcub_machinery_4055"
}

Jeremić, B., Radulović, R.,& Obradović, A.. (2015). Brachistohronic motion of a variable mass nonholonomic mechanical system. in Proceeding of 5th International Congress of Serbian Society of Mechanics Arandjelovac, Serbia, June 15-17, 2015
Srpsko društvo za mehaniku., G3e.
https://hdl.handle.net/21.15107/rcub_machinery_4055

Jeremić B, Radulović R, Obradović A. Brachistohronic motion of a variable mass nonholonomic mechanical system. in Proceeding of 5th International Congress of Serbian Society of Mechanics Arandjelovac, Serbia, June 15-17, 2015. 2015;:G3e.
https://hdl.handle.net/21.15107/rcub_machinery_4055 .

Jeremić, Bojan, Radulović, Radoslav, Obradović, Aleksandar, "Brachistohronic motion of a variable mass nonholonomic mechanical system" in Proceeding of 5th International Congress of Serbian Society of Mechanics Arandjelovac, Serbia, June 15-17, 2015 (2015):G3e,
https://hdl.handle.net/21.15107/rcub_machinery_4055 .

TY  - CONF
AU  - Rusov, Marko
AU  - Lazarević, Mihailo
AU  - Radulović, Radoslav
AU  - Jeremić, Bojan
PY  - 2014
UR  - https://machinery.mas.bg.ac.rs/handle/123456789/4983
AB  - У раду представљен је поступак одређивања трајекторија, као и динамичка анализа петоосне CNC машине, које се најчешће користе у обради слободних форми површина. Први део рада односи се на геометријски прорачун путање алата, док се други део рада односи на динамичку анализу и прорачун брзина и убрзања. Геометријски проблем одређивања трајекторија, брзина и убрзања је у оквирима граница петоосних CNC машина, при изналажењу оптималне путање алата.
C3  - 1th International Symposium on Machines, Mechanics and Mechatronics,Belgrade 01–02.07.2014
T1  - Trajectory and basic multybody dynamic analysis for five–axis CNC machines
UR  - https://hdl.handle.net/21.15107/rcub_machinery_4983
ER  - 

@conference{
author = "Rusov, Marko and Lazarević, Mihailo and Radulović, Radoslav and Jeremić, Bojan",
year = "2014",
abstract = "У раду представљен је поступак одређивања трајекторија, као и динамичка анализа петоосне CNC машине, које се најчешће користе у обради слободних форми површина. Први део рада односи се на геометријски прорачун путање алата, док се други део рада односи на динамичку анализу и прорачун брзина и убрзања. Геометријски проблем одређивања трајекторија, брзина и убрзања је у оквирима граница петоосних CNC машина, при изналажењу оптималне путање алата.",
journal = "1th International Symposium on Machines, Mechanics and Mechatronics,Belgrade 01–02.07.2014",
title = "Trajectory and basic multybody dynamic analysis for five–axis CNC machines",
url = "https://hdl.handle.net/21.15107/rcub_machinery_4983"
}

Rusov, M., Lazarević, M., Radulović, R.,& Jeremić, B.. (2014). Trajectory and basic multybody dynamic analysis for five–axis CNC machines. in 1th International Symposium on Machines, Mechanics and Mechatronics,Belgrade 01–02.07.2014.
https://hdl.handle.net/21.15107/rcub_machinery_4983

Rusov M, Lazarević M, Radulović R, Jeremić B. Trajectory and basic multybody dynamic analysis for five–axis CNC machines. in 1th International Symposium on Machines, Mechanics and Mechatronics,Belgrade 01–02.07.2014. 2014;.
https://hdl.handle.net/21.15107/rcub_machinery_4983 .

Rusov, Marko, Lazarević, Mihailo, Radulović, Radoslav, Jeremić, Bojan, "Trajectory and basic multybody dynamic analysis for five–axis CNC machines" in 1th International Symposium on Machines, Mechanics and Mechatronics,Belgrade 01–02.07.2014 (2014),
https://hdl.handle.net/21.15107/rcub_machinery_4983 .

TY  - CONF
AU  - Radulović, Radoslav
AU  - Zeković, Dragomir
AU  - Lazarević, Mihailo
AU  - Jeremić, Bojan
PY  - 2014
UR  - https://machinery.mas.bg.ac.rs/handle/123456789/5168
AB  - This paper analyzes the problem of brachistochronic planar motion of a mechanical system with nonlinear nonholonomic constraint. The nonholonomic system is represented by two Chaplygin blades [3,4,5,6] of negligible dimensions, which impose nonlinear constraint in the form of perpendicularity of velocities. The brachistrochronic planar motion is considered, with specified initial and terminal positions, at unchanged value of mechanical energy during motion. Differential equations of motion, where the reactions of nonholonomic constraints and control forces figure, are obtained on the basis of general theorems of mechanics [8]. Here, this is more convenient to use than some other methods of analytical mechanics applied to nonholonomic mechanical systems [9], where a subsequent physical interpretation of the multipliers of constraints is required. The formulated brachistochrone problem, with adequately chosen quantities of state, is solved as simple a task of optimal control as possible in this case [6,7] by applying the Pontryagin maximum principle [1]. The corresponding two-point boundary value problem of the system of ordinary nonlinear differential equations is obtained, which has to be numerically solved [2]. Numerical procedure for solving the two-point boundary value problem is performed by the method of shooting. On the basis of thus obtained brachistochronic motion, the active control forces, along with the reactions of nonholonomic constraints, are defined. Using the Coulomb friction laws [8,9], a minimum required value of the coefficient of sliding friction is defined [10], so that the considered system is moving in accordance with nonholonomic bilateral constraints.
C3  - 1th International Symposium on Machines, Mechanics and Mechatronics, Belgrade 01– 02.07.2014
T1  - Analysis of minimum required sliding friction coefficient in the brachistochronic motion of a mechanical system with nonlinear nonholonomic constraint
UR  - https://hdl.handle.net/21.15107/rcub_machinery_5168
ER  - 

@conference{
author = "Radulović, Radoslav and Zeković, Dragomir and Lazarević, Mihailo and Jeremić, Bojan",
year = "2014",
abstract = "This paper analyzes the problem of brachistochronic planar motion of a mechanical system with nonlinear nonholonomic constraint. The nonholonomic system is represented by two Chaplygin blades [3,4,5,6] of negligible dimensions, which impose nonlinear constraint in the form of perpendicularity of velocities. The brachistrochronic planar motion is considered, with specified initial and terminal positions, at unchanged value of mechanical energy during motion. Differential equations of motion, where the reactions of nonholonomic constraints and control forces figure, are obtained on the basis of general theorems of mechanics [8]. Here, this is more convenient to use than some other methods of analytical mechanics applied to nonholonomic mechanical systems [9], where a subsequent physical interpretation of the multipliers of constraints is required. The formulated brachistochrone problem, with adequately chosen quantities of state, is solved as simple a task of optimal control as possible in this case [6,7] by applying the Pontryagin maximum principle [1]. The corresponding two-point boundary value problem of the system of ordinary nonlinear differential equations is obtained, which has to be numerically solved [2]. Numerical procedure for solving the two-point boundary value problem is performed by the method of shooting. On the basis of thus obtained brachistochronic motion, the active control forces, along with the reactions of nonholonomic constraints, are defined. Using the Coulomb friction laws [8,9], a minimum required value of the coefficient of sliding friction is defined [10], so that the considered system is moving in accordance with nonholonomic bilateral constraints.",
journal = "1th International Symposium on Machines, Mechanics and Mechatronics, Belgrade 01– 02.07.2014",
title = "Analysis of minimum required sliding friction coefficient in the brachistochronic motion of a mechanical system with nonlinear nonholonomic constraint",
url = "https://hdl.handle.net/21.15107/rcub_machinery_5168"
}

Radulović, R., Zeković, D., Lazarević, M.,& Jeremić, B.. (2014). Analysis of minimum required sliding friction coefficient in the brachistochronic motion of a mechanical system with nonlinear nonholonomic constraint. in 1th International Symposium on Machines, Mechanics and Mechatronics, Belgrade 01– 02.07.2014.
https://hdl.handle.net/21.15107/rcub_machinery_5168

Radulović R, Zeković D, Lazarević M, Jeremić B. Analysis of minimum required sliding friction coefficient in the brachistochronic motion of a mechanical system with nonlinear nonholonomic constraint. in 1th International Symposium on Machines, Mechanics and Mechatronics, Belgrade 01– 02.07.2014. 2014;.
https://hdl.handle.net/21.15107/rcub_machinery_5168 .

Radulović, Radoslav, Zeković, Dragomir, Lazarević, Mihailo, Jeremić, Bojan, "Analysis of minimum required sliding friction coefficient in the brachistochronic motion of a mechanical system with nonlinear nonholonomic constraint" in 1th International Symposium on Machines, Mechanics and Mechatronics, Belgrade 01– 02.07.2014 (2014),
https://hdl.handle.net/21.15107/rcub_machinery_5168 .

TY  - JOUR
AU  - Radulović, Radoslav
AU  - Zeković, Dragomir
AU  - Lazarević, Mihailo
AU  - Segla, Štefan
AU  - Jeremić, Bojan
PY  - 2014
UR  - https://machinery.mas.bg.ac.rs/handle/123456789/1988
AB  - U ovom radu analizira se problem brahistohronog ravnog kretanja mehaničkog sistema sa nelinearnom neholonomnom vezom. Neholonomni mehanički sistem je predstavljen sa dva Čapljiginova sečiva, zanemarljivih dimenzija, koja nameću nelinearno ograničenje u vidu upravnosti brzina. Razmatra se brahisthrono ravno kretanje pri zadatom početnom i krajnjem položaju uz neizmenjenu vrednost mehaničke energije u toku kretanja. Diferencijalne jednačine kretanja, u kojima figurišu reakcije neholonomnih veza i upravljačkih sila, dobijene su na osnovu opštih teorema dinamike. Ovde je to podesnije umesto nekih drugih metoda analitičke mehanike primenjenih na neholonomne mehaničke sisteme u kojima je neophodno dati naknadno fizičko tumačenje množitelja veza. Formulisan brahistohroni problem, uz odgovarajući izbor veličina stanja je rešen kao, najjednostavniji u ovom slučaju, zadatak optimalnog upravljanja primenom Pontryagin-ovog principa maksimuma. Dobijen je odgovarajući dvotačkasti granični problem sistema običnih nelinearnih diferencijalnih jednačina koji je neophodno numerički rešiti. Numerički postupak za rešavanje dvotačkastog graničnog problema vrši se metodom šutinga. Na osnovu tako dobijenog brahistohronog kretanja određuju se aktivne upravljačke sile, a ujedno i reakcije neholonomnih veza. Koristeći Kulonove zakone trenja klizanja, određuje se minimalno potrebna vrednost koeficijenta trenja klizanja, tako da se razmatrani sistem kreće u skladu sa neholonomnim zadržavajućim vezama.
AB  - This paper analyzes the problem of brachistochronic planar motion of a mechanical system with nonlinear nonholonomic constraint. The nonholonomic system is represented by two Chaplygin blades of negligible dimensions, which impose nonlinear constraint in the form of perpendicularity of velocities. The brachistrochronic planar motion is considered, with specified initial and terminal positions, at unchanged value of mechanical energy during motion. Differential equations of motion, where the reactions of nonholonomic constraints and control forces figure, are obtained on the basis of general theorems of mechanics. Here, this is more convenient to use than some other methods of analytical mechanics applied to nonholonomic mechanical systems, where a subsequent physical interpretation of the multipliers of constraints is required. The formulated brachistochrone problem, with adequately chosen quantities of state, is solved as simple a task of optimal control as possible in this case by applying the Pontryagin maximum principle. The corresponding two-point boundary value problem of the system of ordinary nonlinear differential equations is obtained, which has to be numerically solved. Numerical procedure for solving the two-point boundary value problem is performed by the method of shooting. On the basis of thus obtained brachistochronic motion, the active control forces, along with the reactions of nonholonomic constraints, are defined. Using the Coulomb friction laws, a minimum required value of the coefficient of sliding friction is defined, so that the considered system is moving in accordance with nonholonomic bilateral constraints.
PB  - Univerzitet u Beogradu - Mašinski fakultet, Beograd
T2  - FME Transactions
T1  - Analiza brahistohronog kretanja mehaničkog sistema sa nelinearnom neholonomnom vezom
T1  - Analysis the brachistochronic motion of a mechanical system with nonlinear nonholonomic constraint
EP  - 296
IS  - 4
SP  - 290
VL  - 42
DO  - 10.5937/fmet1404290R
ER  - 

@article{
author = "Radulović, Radoslav and Zeković, Dragomir and Lazarević, Mihailo and Segla, Štefan and Jeremić, Bojan",
year = "2014",
abstract = "U ovom radu analizira se problem brahistohronog ravnog kretanja mehaničkog sistema sa nelinearnom neholonomnom vezom. Neholonomni mehanički sistem je predstavljen sa dva Čapljiginova sečiva, zanemarljivih dimenzija, koja nameću nelinearno ograničenje u vidu upravnosti brzina. Razmatra se brahisthrono ravno kretanje pri zadatom početnom i krajnjem položaju uz neizmenjenu vrednost mehaničke energije u toku kretanja. Diferencijalne jednačine kretanja, u kojima figurišu reakcije neholonomnih veza i upravljačkih sila, dobijene su na osnovu opštih teorema dinamike. Ovde je to podesnije umesto nekih drugih metoda analitičke mehanike primenjenih na neholonomne mehaničke sisteme u kojima je neophodno dati naknadno fizičko tumačenje množitelja veza. Formulisan brahistohroni problem, uz odgovarajući izbor veličina stanja je rešen kao, najjednostavniji u ovom slučaju, zadatak optimalnog upravljanja primenom Pontryagin-ovog principa maksimuma. Dobijen je odgovarajući dvotačkasti granični problem sistema običnih nelinearnih diferencijalnih jednačina koji je neophodno numerički rešiti. Numerički postupak za rešavanje dvotačkastog graničnog problema vrši se metodom šutinga. Na osnovu tako dobijenog brahistohronog kretanja određuju se aktivne upravljačke sile, a ujedno i reakcije neholonomnih veza. Koristeći Kulonove zakone trenja klizanja, određuje se minimalno potrebna vrednost koeficijenta trenja klizanja, tako da se razmatrani sistem kreće u skladu sa neholonomnim zadržavajućim vezama., This paper analyzes the problem of brachistochronic planar motion of a mechanical system with nonlinear nonholonomic constraint. The nonholonomic system is represented by two Chaplygin blades of negligible dimensions, which impose nonlinear constraint in the form of perpendicularity of velocities. The brachistrochronic planar motion is considered, with specified initial and terminal positions, at unchanged value of mechanical energy during motion. Differential equations of motion, where the reactions of nonholonomic constraints and control forces figure, are obtained on the basis of general theorems of mechanics. Here, this is more convenient to use than some other methods of analytical mechanics applied to nonholonomic mechanical systems, where a subsequent physical interpretation of the multipliers of constraints is required. The formulated brachistochrone problem, with adequately chosen quantities of state, is solved as simple a task of optimal control as possible in this case by applying the Pontryagin maximum principle. The corresponding two-point boundary value problem of the system of ordinary nonlinear differential equations is obtained, which has to be numerically solved. Numerical procedure for solving the two-point boundary value problem is performed by the method of shooting. On the basis of thus obtained brachistochronic motion, the active control forces, along with the reactions of nonholonomic constraints, are defined. Using the Coulomb friction laws, a minimum required value of the coefficient of sliding friction is defined, so that the considered system is moving in accordance with nonholonomic bilateral constraints.",
publisher = "Univerzitet u Beogradu - Mašinski fakultet, Beograd",
journal = "FME Transactions",
title = "Analiza brahistohronog kretanja mehaničkog sistema sa nelinearnom neholonomnom vezom, Analysis the brachistochronic motion of a mechanical system with nonlinear nonholonomic constraint",
pages = "296-290",
number = "4",
volume = "42",
doi = "10.5937/fmet1404290R"
}

Radulović, R., Zeković, D., Lazarević, M., Segla, Š.,& Jeremić, B.. (2014). Analiza brahistohronog kretanja mehaničkog sistema sa nelinearnom neholonomnom vezom. in FME Transactions
Univerzitet u Beogradu - Mašinski fakultet, Beograd., 42(4), 290-296.
https://doi.org/10.5937/fmet1404290R

Radulović R, Zeković D, Lazarević M, Segla Š, Jeremić B. Analiza brahistohronog kretanja mehaničkog sistema sa nelinearnom neholonomnom vezom. in FME Transactions. 2014;42(4):290-296.
doi:10.5937/fmet1404290R .

Radulović, Radoslav, Zeković, Dragomir, Lazarević, Mihailo, Segla, Štefan, Jeremić, Bojan, "Analiza brahistohronog kretanja mehaničkog sistema sa nelinearnom neholonomnom vezom" in FME Transactions, 42, no. 4 (2014):290-296,
https://doi.org/10.5937/fmet1404290R . .

TY  - JOUR
AU  - Radulović, Radoslav
AU  - Obradović, Aleksandar
AU  - Jeremić, Bojan
PY  - 2014
UR  - https://machinery.mas.bg.ac.rs/handle/123456789/1972
AB  - Analizira se problem brahistohronog kretanja mehaničkog sistema na primeru jednog uprošćenog modela vozila. Sistem se kreće između dva zadata položaja pri neizmenjenoj vrednosti mehaničke energije u toku kretanja. Diferencijalne jednačine kretanja, u kojima figurišu reakcije neholonomnih veza i upravljačke sile, dobijaju se na osnovu opštih teorema dinamike. Ovde je to podesnije umesto nekih drugih metoda analitičke mehanike primenjenih na neholonomne sisteme, u kojima je neophodno dati naknadno fizičko tumačenje množitelja veza da bi se ovaj problem rešio. Podesnim izborom veličina stanja, dobija se, najprostiji moguć u ovom slučaju, zadatak optimalnog upravljanja, koji se rešava primenom Pontrjaginovog principa maksimuma. Numeričko rešavanje dvotačkastog graničnog problema vrši se metodom šutinga. Na osnovu tako dobijenog brahistohronog kretanja određuju se aktivne upravljačke sile, a ujedno i reakcije veza. Koristeći Kulonove zakone trenja klizanja, određuje se minimalno potrebna vrednost koeficijenta trenja klizanja, da ne bi došlo do proklizavanja vozila u tačkama kontakta sa podlogom.
AB  - The paper analyzes the problem of brachistochronic motion of a nonholonomic mechanical system, using an example of a simple car model. The system moves between two default positions at an unaltered value of the mechanical energy during motion. Differential equations of motion, containing the reaction of nonholonomic constraints and control forces, are obtained on the basis of general theorems of dynamics. Here, this is more appropriate than some other methods of analytical mechanics applied to nonholonomic systems, where the provision of a subsequent physical interpretation of the multipliers of constraints is required to solve this problem. By the appropriate choice of the parameters of state as simple a task of optimal control as possible is obtained in this case, which is solved by the application of the Pontryagin maximum principle. Numerical solution of the two-point boundary value problem is obtained by the method of shooting. Based on the thus acquired brachistochronic motion, the active control forces are determined as well as the reaction of constraints. Using the Coulomb laws of friction sliding, the minimum value of the coefficient of friction is determined to avoid car skidding at the points of contact with the ground.
PB  - Univerzitet u Beogradu - Mašinski fakultet, Beograd
T2  - FME Transactions
T1  - Analiza minimalno potrebnog koeficijenta trenja klizanja pri brahistohronom kretanju neholonomnog mehaničkog sistema
T1  - Analysis of the minimum required coefficient of sliding friction at brachistochronic motion of a nonholonomic mechanical system
EP  - 204
IS  - 3
SP  - 199
VL  - 42
DO  - 10.5937/fmet1403199R
ER  - 

@article{
author = "Radulović, Radoslav and Obradović, Aleksandar and Jeremić, Bojan",
year = "2014",
abstract = "Analizira se problem brahistohronog kretanja mehaničkog sistema na primeru jednog uprošćenog modela vozila. Sistem se kreće između dva zadata položaja pri neizmenjenoj vrednosti mehaničke energije u toku kretanja. Diferencijalne jednačine kretanja, u kojima figurišu reakcije neholonomnih veza i upravljačke sile, dobijaju se na osnovu opštih teorema dinamike. Ovde je to podesnije umesto nekih drugih metoda analitičke mehanike primenjenih na neholonomne sisteme, u kojima je neophodno dati naknadno fizičko tumačenje množitelja veza da bi se ovaj problem rešio. Podesnim izborom veličina stanja, dobija se, najprostiji moguć u ovom slučaju, zadatak optimalnog upravljanja, koji se rešava primenom Pontrjaginovog principa maksimuma. Numeričko rešavanje dvotačkastog graničnog problema vrši se metodom šutinga. Na osnovu tako dobijenog brahistohronog kretanja određuju se aktivne upravljačke sile, a ujedno i reakcije veza. Koristeći Kulonove zakone trenja klizanja, određuje se minimalno potrebna vrednost koeficijenta trenja klizanja, da ne bi došlo do proklizavanja vozila u tačkama kontakta sa podlogom., The paper analyzes the problem of brachistochronic motion of a nonholonomic mechanical system, using an example of a simple car model. The system moves between two default positions at an unaltered value of the mechanical energy during motion. Differential equations of motion, containing the reaction of nonholonomic constraints and control forces, are obtained on the basis of general theorems of dynamics. Here, this is more appropriate than some other methods of analytical mechanics applied to nonholonomic systems, where the provision of a subsequent physical interpretation of the multipliers of constraints is required to solve this problem. By the appropriate choice of the parameters of state as simple a task of optimal control as possible is obtained in this case, which is solved by the application of the Pontryagin maximum principle. Numerical solution of the two-point boundary value problem is obtained by the method of shooting. Based on the thus acquired brachistochronic motion, the active control forces are determined as well as the reaction of constraints. Using the Coulomb laws of friction sliding, the minimum value of the coefficient of friction is determined to avoid car skidding at the points of contact with the ground.",
publisher = "Univerzitet u Beogradu - Mašinski fakultet, Beograd",
journal = "FME Transactions",
title = "Analiza minimalno potrebnog koeficijenta trenja klizanja pri brahistohronom kretanju neholonomnog mehaničkog sistema, Analysis of the minimum required coefficient of sliding friction at brachistochronic motion of a nonholonomic mechanical system",
pages = "204-199",
number = "3",
volume = "42",
doi = "10.5937/fmet1403199R"
}

Radulović, R., Obradović, A.,& Jeremić, B.. (2014). Analiza minimalno potrebnog koeficijenta trenja klizanja pri brahistohronom kretanju neholonomnog mehaničkog sistema. in FME Transactions
Univerzitet u Beogradu - Mašinski fakultet, Beograd., 42(3), 199-204.
https://doi.org/10.5937/fmet1403199R

Radulović R, Obradović A, Jeremić B. Analiza minimalno potrebnog koeficijenta trenja klizanja pri brahistohronom kretanju neholonomnog mehaničkog sistema. in FME Transactions. 2014;42(3):199-204.
doi:10.5937/fmet1403199R .

Radulović, Radoslav, Obradović, Aleksandar, Jeremić, Bojan, "Analiza minimalno potrebnog koeficijenta trenja klizanja pri brahistohronom kretanju neholonomnog mehaničkog sistema" in FME Transactions, 42, no. 3 (2014):199-204,
https://doi.org/10.5937/fmet1403199R . .

TY  - CONF
AU  - Radulović, Radoslav
AU  - Obradović, Aleksandar
AU  - Jeremić, Bojan
PY  - 2013
UR  - https://machinery.mas.bg.ac.rs/handle/123456789/4038
AB  - The paper analyzes the problem of brachistochronic motion of a nonholonomic
mechanical system, using an example of a simple car model. The system moves between
two default positions at an unaltered value of the mechanical energy during motion.
Differential equations of motion, containing the reaction of nonholonomic constraints and
control forces, are obtained on the basis of general theorems of dynamics. Here, this is more
appropriate than some other methods of analytical mechanics applied to nonholonomic
systems, where the provision of a subsequent physical interpretation of the multipliers of
constraints is required to solve this problem. By the appropriate choice of the parameters of
state as simple a task of optimal control as possible is obtained in this case, which is solved
by the application of the Pontryagin maximum principle. Numerical solution of the twopoint
boundary value problem is obtained by the method of shooting. Based on the thus
acquired brachistochronic motion, the active control forces are determined as well as the
reaction of constraints. Using the Coulomb laws of friction sliding, the minimum value of
the coefficient of friction is determined to avoid car skidding at the points of contact with
the ground.
PB  - Beograd : Srpsko društvo za mehaniku
C3  - Proceeding of Fourth Serbian (29th Yu) Congress on Theoretical and Applied Mechanics Vrnja ka Banja, Serbia, 4-7 June 2013
T1  - Brachistohronic motion of a nonholonomic mechanical system with limited reaction of constraints
EP  - 908
SP  - 903
UR  - https://hdl.handle.net/21.15107/rcub_machinery_4038
ER  - 

@conference{
author = "Radulović, Radoslav and Obradović, Aleksandar and Jeremić, Bojan",
year = "2013",
abstract = "The paper analyzes the problem of brachistochronic motion of a nonholonomic
mechanical system, using an example of a simple car model. The system moves between
two default positions at an unaltered value of the mechanical energy during motion.
Differential equations of motion, containing the reaction of nonholonomic constraints and
control forces, are obtained on the basis of general theorems of dynamics. Here, this is more
appropriate than some other methods of analytical mechanics applied to nonholonomic
systems, where the provision of a subsequent physical interpretation of the multipliers of
constraints is required to solve this problem. By the appropriate choice of the parameters of
state as simple a task of optimal control as possible is obtained in this case, which is solved
by the application of the Pontryagin maximum principle. Numerical solution of the twopoint
boundary value problem is obtained by the method of shooting. Based on the thus
acquired brachistochronic motion, the active control forces are determined as well as the
reaction of constraints. Using the Coulomb laws of friction sliding, the minimum value of
the coefficient of friction is determined to avoid car skidding at the points of contact with
the ground.",
publisher = "Beograd : Srpsko društvo za mehaniku",
journal = "Proceeding of Fourth Serbian (29th Yu) Congress on Theoretical and Applied Mechanics Vrnja ka Banja, Serbia, 4-7 June 2013",
title = "Brachistohronic motion of a nonholonomic mechanical system with limited reaction of constraints",
pages = "908-903",
url = "https://hdl.handle.net/21.15107/rcub_machinery_4038"
}

Radulović, R., Obradović, A.,& Jeremić, B.. (2013). Brachistohronic motion of a nonholonomic mechanical system with limited reaction of constraints. in Proceeding of Fourth Serbian (29th Yu) Congress on Theoretical and Applied Mechanics Vrnja ka Banja, Serbia, 4-7 June 2013
Beograd : Srpsko društvo za mehaniku., 903-908.
https://hdl.handle.net/21.15107/rcub_machinery_4038

Radulović R, Obradović A, Jeremić B. Brachistohronic motion of a nonholonomic mechanical system with limited reaction of constraints. in Proceeding of Fourth Serbian (29th Yu) Congress on Theoretical and Applied Mechanics Vrnja ka Banja, Serbia, 4-7 June 2013. 2013;:903-908.
https://hdl.handle.net/21.15107/rcub_machinery_4038 .

Radulović, Radoslav, Obradović, Aleksandar, Jeremić, Bojan, "Brachistohronic motion of a nonholonomic mechanical system with limited reaction of constraints" in Proceeding of Fourth Serbian (29th Yu) Congress on Theoretical and Applied Mechanics Vrnja ka Banja, Serbia, 4-7 June 2013 (2013):903-908,
https://hdl.handle.net/21.15107/rcub_machinery_4038 .