The Invariance of Oscillatory Mechanical Systems
Апстракт
The authors of this paper begin by stating that oscillations are natural and objective phenomena that do not depend on mathematical description. Some authors base their descriptions on Newton's axioms or laws, other most frequently on Hamilton's canonic differential equations. Therefore, the very foundations of rational mechanics contain inconsistency. Newton's mechanics is concerned with solving two main problems. The first is to determine the motion with all forces being known, and the other, to determine the forces with motions being known. However, Hamilton's mechanics has only one problem integration of 2n differential (Hamilton's) equations, that are not invariant with respect to linear differential transformations. It is a widely accepted understanding that acceleration is not invariant over Riemann's multiplicities with respect to different coordinate systems, which leads to inaccurate conclusions regarding the motion itself. A more precise interpretation of these problems is s...tated here. It should not be concluded, that the equilibrium state, that is stable with respect to one coordinate system, is simultaneously indeterminate or instable with respect to other coordinate system. The inconsistency is especially obvious in conception of metric tensor of Riemman geometry, opposed to corresponding Lagrange's basic tensor of n dimensional configurational multiplicities.
Кључне речи:
Hamilton's mechanicsИзвор:
Vibration Problems, Icovp 2011, Supplement, 2011, 268-273Издавач:
- Technical University Liberec, Liberec
Финансирање / пројекти:
- Динамика хибридних система сложених структура. Механика материјала (RS-MESTD-Basic Research (BR or ON)-174001)
- Dynamics of hybrid systems with complex structures
Колекције
Институција/група
Mašinski fakultetTY - CONF AU - Vujicić, V. AU - Trišović, Nataša PY - 2011 UR - https://machinery.mas.bg.ac.rs/handle/123456789/1174 AB - The authors of this paper begin by stating that oscillations are natural and objective phenomena that do not depend on mathematical description. Some authors base their descriptions on Newton's axioms or laws, other most frequently on Hamilton's canonic differential equations. Therefore, the very foundations of rational mechanics contain inconsistency. Newton's mechanics is concerned with solving two main problems. The first is to determine the motion with all forces being known, and the other, to determine the forces with motions being known. However, Hamilton's mechanics has only one problem integration of 2n differential (Hamilton's) equations, that are not invariant with respect to linear differential transformations. It is a widely accepted understanding that acceleration is not invariant over Riemann's multiplicities with respect to different coordinate systems, which leads to inaccurate conclusions regarding the motion itself. A more precise interpretation of these problems is stated here. It should not be concluded, that the equilibrium state, that is stable with respect to one coordinate system, is simultaneously indeterminate or instable with respect to other coordinate system. The inconsistency is especially obvious in conception of metric tensor of Riemman geometry, opposed to corresponding Lagrange's basic tensor of n dimensional configurational multiplicities. PB - Technical University Liberec, Liberec C3 - Vibration Problems, Icovp 2011, Supplement T1 - The Invariance of Oscillatory Mechanical Systems EP - 273 SP - 268 UR - https://hdl.handle.net/21.15107/rcub_machinery_1174 ER -
@conference{ author = "Vujicić, V. and Trišović, Nataša", year = "2011", abstract = "The authors of this paper begin by stating that oscillations are natural and objective phenomena that do not depend on mathematical description. Some authors base their descriptions on Newton's axioms or laws, other most frequently on Hamilton's canonic differential equations. Therefore, the very foundations of rational mechanics contain inconsistency. Newton's mechanics is concerned with solving two main problems. The first is to determine the motion with all forces being known, and the other, to determine the forces with motions being known. However, Hamilton's mechanics has only one problem integration of 2n differential (Hamilton's) equations, that are not invariant with respect to linear differential transformations. It is a widely accepted understanding that acceleration is not invariant over Riemann's multiplicities with respect to different coordinate systems, which leads to inaccurate conclusions regarding the motion itself. A more precise interpretation of these problems is stated here. It should not be concluded, that the equilibrium state, that is stable with respect to one coordinate system, is simultaneously indeterminate or instable with respect to other coordinate system. The inconsistency is especially obvious in conception of metric tensor of Riemman geometry, opposed to corresponding Lagrange's basic tensor of n dimensional configurational multiplicities.", publisher = "Technical University Liberec, Liberec", journal = "Vibration Problems, Icovp 2011, Supplement", title = "The Invariance of Oscillatory Mechanical Systems", pages = "273-268", url = "https://hdl.handle.net/21.15107/rcub_machinery_1174" }
Vujicić, V.,& Trišović, N.. (2011). The Invariance of Oscillatory Mechanical Systems. in Vibration Problems, Icovp 2011, Supplement Technical University Liberec, Liberec., 268-273. https://hdl.handle.net/21.15107/rcub_machinery_1174
Vujicić V, Trišović N. The Invariance of Oscillatory Mechanical Systems. in Vibration Problems, Icovp 2011, Supplement. 2011;:268-273. https://hdl.handle.net/21.15107/rcub_machinery_1174 .
Vujicić, V., Trišović, Nataša, "The Invariance of Oscillatory Mechanical Systems" in Vibration Problems, Icovp 2011, Supplement (2011):268-273, https://hdl.handle.net/21.15107/rcub_machinery_1174 .