Introduction to Fractional Calculus with Brief Historical Background
Само за регистроване кориснике
2014
Поглавље у монографији (Објављена верзија)
Метаподаци
Приказ свих података о документуАпстракт
The Fractional Calculus (FC) is a generalization of classical calculus concerned with operations of
integration and differentiation of non-integer (fractional) order. The concept of fractional operators has been introduced almost simultaneously with the development of the classical ones. The first known reference can be found in the correspondence of G. W. Leibniz and Marquis de l’Hospital in 1695 where the question of meaning of the semi-derivative has been raised. This question consequently attracted the interest of many wellknown mathematicians, including Euler, Liouville, Laplace, Riemann, Grünwald, Letnikov and many others. Since the 19th century, the theory of fractional calculus developed rapidly, mostly as a foundation for a number of applied disciplines, including fractional geometry, fractional differential equations (FDE) and fractional dynamics. The applications of FC are very wide nowadays. It is safe to say that almost no discipline of modern engineering and science in g...eneral, remains untouched by the tools and techniques of fractional calculus. For example, wide and fruitful applications can be found in rheology, viscoelasticity, acoustics, optics, chemical and statistical physics, robotics, control theory, electrical and mechanical engineering, bioengineering, etc..In fact, one could argue that real world processes are fractional order systems in general. The main reason for the success of FC applications is that these new fractional-order models are often more accurate than integer-order ones, i.e. there are more degrees of freedom in the fractional order model than in the corresponding classical one. One of the intriguing beauties of the subject is that fractional derivatives (and integrals) are not a local (or point) quantities. All fractional operators consider the entire history of the process being considered, thus being able to model the non-local and distributed effects often encountered in natural and technical phenomena. Fractional calculus is therefore an excellent set of tools for describing the memory and hereditary properties of various materials and processes.
Кључне речи:
fractional calculus / historical background / Riemann-Liouville definition / Grunwald-Letnikov definition / Caputo definitionИзвор:
Advanced Topics on Applications of Fractional Calculus on Control Problems, System Stability And Modeling, 2014, 3-16Издавач:
- WSEAS Press
Финансирање / пројекти:
- Одрживост и унапређење машинских система у енергетици и транспорту применом форензичког инжењерства, еко и робуст дизајна (RS-MESTD-Technological Development (TD or TR)-35006)
- Развој нових метода и техника за рану дијагностику канцера грлића материце, дебелог црева, усне дупље и меланома на бази дигиталне слике и ексцитационо-емисионих спектара у видљивом и инфрацрвеном домену (RS-MESTD-Integrated and Interdisciplinary Research (IIR or III)-41006)
- Повећање енергетске ефикасности ХЕ и ТЕ ЕПС-а развојем технологије и уређаја енергетске електронике за регулацију и аутоматизацију (RS-MESTD-Technological Development (TD or TR)-33020)
- Динамика хибридних система сложених структура. Механика материјала (RS-MESTD-Basic Research (BR or ON)-174001)
Колекције
Институција/група
Mašinski fakultetTY - CHAP AU - Lazarević, Mihailo AU - Rapaić, Milan AU - Šekara, Tomislav PY - 2014 UR - https://machinery.mas.bg.ac.rs/handle/123456789/6683 AB - The Fractional Calculus (FC) is a generalization of classical calculus concerned with operations of integration and differentiation of non-integer (fractional) order. The concept of fractional operators has been introduced almost simultaneously with the development of the classical ones. The first known reference can be found in the correspondence of G. W. Leibniz and Marquis de l’Hospital in 1695 where the question of meaning of the semi-derivative has been raised. This question consequently attracted the interest of many wellknown mathematicians, including Euler, Liouville, Laplace, Riemann, Grünwald, Letnikov and many others. Since the 19th century, the theory of fractional calculus developed rapidly, mostly as a foundation for a number of applied disciplines, including fractional geometry, fractional differential equations (FDE) and fractional dynamics. The applications of FC are very wide nowadays. It is safe to say that almost no discipline of modern engineering and science in general, remains untouched by the tools and techniques of fractional calculus. For example, wide and fruitful applications can be found in rheology, viscoelasticity, acoustics, optics, chemical and statistical physics, robotics, control theory, electrical and mechanical engineering, bioengineering, etc..In fact, one could argue that real world processes are fractional order systems in general. The main reason for the success of FC applications is that these new fractional-order models are often more accurate than integer-order ones, i.e. there are more degrees of freedom in the fractional order model than in the corresponding classical one. One of the intriguing beauties of the subject is that fractional derivatives (and integrals) are not a local (or point) quantities. All fractional operators consider the entire history of the process being considered, thus being able to model the non-local and distributed effects often encountered in natural and technical phenomena. Fractional calculus is therefore an excellent set of tools for describing the memory and hereditary properties of various materials and processes. PB - WSEAS Press T2 - Advanced Topics on Applications of Fractional Calculus on Control Problems, System Stability And Modeling T1 - Introduction to Fractional Calculus with Brief Historical Background EP - 16 SP - 3 UR - https://hdl.handle.net/21.15107/rcub_machinery_6683 ER -
@inbook{ author = "Lazarević, Mihailo and Rapaić, Milan and Šekara, Tomislav", year = "2014", abstract = "The Fractional Calculus (FC) is a generalization of classical calculus concerned with operations of integration and differentiation of non-integer (fractional) order. The concept of fractional operators has been introduced almost simultaneously with the development of the classical ones. The first known reference can be found in the correspondence of G. W. Leibniz and Marquis de l’Hospital in 1695 where the question of meaning of the semi-derivative has been raised. This question consequently attracted the interest of many wellknown mathematicians, including Euler, Liouville, Laplace, Riemann, Grünwald, Letnikov and many others. Since the 19th century, the theory of fractional calculus developed rapidly, mostly as a foundation for a number of applied disciplines, including fractional geometry, fractional differential equations (FDE) and fractional dynamics. The applications of FC are very wide nowadays. It is safe to say that almost no discipline of modern engineering and science in general, remains untouched by the tools and techniques of fractional calculus. For example, wide and fruitful applications can be found in rheology, viscoelasticity, acoustics, optics, chemical and statistical physics, robotics, control theory, electrical and mechanical engineering, bioengineering, etc..In fact, one could argue that real world processes are fractional order systems in general. The main reason for the success of FC applications is that these new fractional-order models are often more accurate than integer-order ones, i.e. there are more degrees of freedom in the fractional order model than in the corresponding classical one. One of the intriguing beauties of the subject is that fractional derivatives (and integrals) are not a local (or point) quantities. All fractional operators consider the entire history of the process being considered, thus being able to model the non-local and distributed effects often encountered in natural and technical phenomena. Fractional calculus is therefore an excellent set of tools for describing the memory and hereditary properties of various materials and processes.", publisher = "WSEAS Press", journal = "Advanced Topics on Applications of Fractional Calculus on Control Problems, System Stability And Modeling", booktitle = "Introduction to Fractional Calculus with Brief Historical Background", pages = "16-3", url = "https://hdl.handle.net/21.15107/rcub_machinery_6683" }
Lazarević, M., Rapaić, M.,& Šekara, T.. (2014). Introduction to Fractional Calculus with Brief Historical Background. in Advanced Topics on Applications of Fractional Calculus on Control Problems, System Stability And Modeling WSEAS Press., 3-16. https://hdl.handle.net/21.15107/rcub_machinery_6683
Lazarević M, Rapaić M, Šekara T. Introduction to Fractional Calculus with Brief Historical Background. in Advanced Topics on Applications of Fractional Calculus on Control Problems, System Stability And Modeling. 2014;:3-16. https://hdl.handle.net/21.15107/rcub_machinery_6683 .
Lazarević, Mihailo, Rapaić, Milan, Šekara, Tomislav, "Introduction to Fractional Calculus with Brief Historical Background" in Advanced Topics on Applications of Fractional Calculus on Control Problems, System Stability And Modeling (2014):3-16, https://hdl.handle.net/21.15107/rcub_machinery_6683 .