Approximate Conservation Laws of Nonvariational Differential Equations

Abstract: The concept of an approximate multiplier (integrating factor) is introduced. Such multipliers are shown to give rise to approximate local conservation laws for differential equations that admit a small perturbation. We develop an explicit, algorithmic and efficient method to construct both the approximate multipliers and their corresponding approximate fluxes. Our method is applicable to equations with any number of independent and dependent variables, linear or nonlinear, is adaptable to deal with any order o… Show more

“…For more details on the application of symmetries on PDEs and on physical problems we refer the reader in [24][25][26][27][28][29][30] and references therein.…”

Singularity analysis and analytic solutions for the Benney-Gjevik equations

“…For more details on the application of symmetries on PDEs and on physical problems we refer the reader in [24][25][26][27][28][29][30] and references therein.…”

Singularity analysis and analytic solutions for the Benney-Gjevik equations

On the conservation laws, Lie symmetry analysis and power series solutions of a class of third-order polynomial evolution equations

On the Formulaic Solution of a $$(n+1)$$th Order Differential Equation