Stephen C. Anco scite author profile

This paper gives a general treatment and proof of the direct conservation law method presented in Part I (see [3]). In particular, the treatment here applies to finding the local conservation laws of any system of one or more partial differential equations expressed in a standard Cauchy-Kovalevskaya form. A summary of the general method and its effective computational implementation is also given.

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Direct construction method for conservation laws of partial differential equations Part I: Examples of conservation law classifications

Anco¹,

Bluman²

2002

Eur. J. Appl. Math

435

450

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An effective algorithmic method is presented for finding the local conservation laws for partial differential equations with any number of independent and dependent variables. The method does not require the use or existence of a variational principle and reduces the calculation of conservation laws to solving a system of linear determining equations similar to that for finding symmetries. An explicit construction formula is derived which yields a conservation law for each solution of the determining system. In the first of two papers (Part I), examples of nonlinear wave equations are used to exhibit the method. Classification results for conservation laws of these equations are obtained. In a second paper (Part II), a general treatment of the method is given.

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Direct Construction of Conservation Laws from Field Equations

1997

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Generalization of Noether’s Theorem in Modern Form to Non-variational Partial Differential Equations

Anco

2017

101

244

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Stephen C. Anco

Applications of Symmetry Methods to Partial Differential Equations

Direct construction method for conservation laws of partial differential equations Part II: General treatment

Direct construction method for conservation laws of partial differential equations Part I: Examples of conservation law classifications

Direct Construction of Conservation Laws from Field Equations

Generalization of Noether’s Theorem in Modern Form to Non-variational Partial Differential Equations

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