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Main Authors: Gorgone, M., Inferrera, G.
Format: Preprint
Published: 2025
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Online Access:https://arxiv.org/abs/2505.23390
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author Gorgone, M.
Inferrera, G.
author_facet Gorgone, M.
Inferrera, G.
contents In this paper, non-variational systems of differential equations containing small terms are considered, and a consistent approach for deriving approximate conservation laws through the introduction of approximate Lagrange multipliers is developed. The proposed formulation of the approximate direct method starts by assuming the Lagrange multipliers to be dependent on the small parameter; then, by expanding the dependent variables in power series of the small parameter, we consider the consistent expansion of all the involved quantities (equations and Lagrange multipliers) in such a way the basic principles of perturbation analysis are not violated. Consequently, a theorem leading to the determination of approximate multipliers whence approximate conservation laws arise is proved, and the role of approximate Euler operators emphasized. Some applications of the procedure are presented.
format Preprint
id arxiv_https___arxiv_org_abs_2505_23390
institution arXiv
publishDate 2025
record_format arxiv
spellingShingle Direct approach to approximate conservation laws
Gorgone, M.
Inferrera, G.
Mathematical Physics
In this paper, non-variational systems of differential equations containing small terms are considered, and a consistent approach for deriving approximate conservation laws through the introduction of approximate Lagrange multipliers is developed. The proposed formulation of the approximate direct method starts by assuming the Lagrange multipliers to be dependent on the small parameter; then, by expanding the dependent variables in power series of the small parameter, we consider the consistent expansion of all the involved quantities (equations and Lagrange multipliers) in such a way the basic principles of perturbation analysis are not violated. Consequently, a theorem leading to the determination of approximate multipliers whence approximate conservation laws arise is proved, and the role of approximate Euler operators emphasized. Some applications of the procedure are presented.
title Direct approach to approximate conservation laws
topic Mathematical Physics
url https://arxiv.org/abs/2505.23390