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This article is cited in 21 scientific papers (total in 21 papers)
Constructing conservation laws for fractional-order integro-differential equations
S. Yu. Lukashchuk Ufa State Aviation Technical University, Ufa, Russia
Abstract:
In a class of functions depending on linear integro-differential fractional-order variables, we prove an analogue of the fundamental operator identity relating the infinitesimal operator of a point transformation group, the Euler–Lagrange differential operator, and Noether operators. Using this identity, we prove fractional-differential analogues of the Noether theorem and its generalizations applicable to equations with fractional-order integrals and derivatives of various types that are Euler–Lagrange equations. In explicit form, we give fractional-differential generalizations of Noether operators that gives an efficient way to construct conservation laws, which we illustrate with three examples.
Keywords:
integro-differential fractional-order equation, symmetry, conservation law, fundamental operator identity, Noether theorem.
Received: 03.12.2014 Revised: 03.03.2015
Citation:
S. Yu. Lukashchuk, “Constructing conservation laws for fractional-order integro-differential equations”, TMF, 184:2 (2015), 179–199; Theoret. and Math. Phys., 184:2 (2015), 1049–1066
Linking options:
https://www.mathnet.ru/eng/tmf8833https://doi.org/10.4213/tmf8833 https://www.mathnet.ru/eng/tmf/v184/i2/p179
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Abstract page: | 528 | Full-text PDF : | 175 | References: | 83 | First page: | 64 |
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