On New Conservation Laws of Fin Equation

On New Conservation Laws of Fin Equation

We study the new conservation forms of the nonlinear fin equation in mathematical physics. In this study, first, Lie point symmetries of the fin equation are identified and classified. Then by using the relationship of Lie symmetry and λ-symmetry, new λ-functions are investigated. In addition, the J...

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Veröffentlicht in:Advances in Mathematical Physics 2014-01, Vol.2014 (2014), p.531-546
Hauptverfasser: Polat, Gulden Gun, Orhan, Ozlem, Ozer, Teoman
Format: Artikel
Sprache:eng
Schlagworte:
Analysis
Conservation
Conservation laws
Conservation laws (Physics)
Heat conductivity
Heat transfer
Invariants
Lie groups
Mathematical analysis
Mathematical models
Multipliers
Nonlinearity
Ordinary differential equations
Partial differential equations
Studies
Symmetry
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Beschreibung
Zusammenfassung:We study the new conservation forms of the nonlinear fin equation in mathematical physics. In this study, first, Lie point symmetries of the fin equation are identified and classified. Then by using the relationship of Lie symmetry and λ-symmetry, new λ-functions are investigated. In addition, the Jacobi Last Multiplier method and the approach, which is based on the fact λ-functions are assumed to be of linear form, are considered as different procedures for lambda symmetry analysis. Finally, the corresponding new conservation laws and invariant solutions of the equation are presented.
ISSN:1687-9120
1687-9139
DOI:10.1155/2014/695408