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Potential equivalence transformations for nonlinear diffusion-convection equations
Potential equivalence transformations (PETs) are effectively applied to a
class of nonlinear diffusion-convection equations. For this class all possible
potential symmetries are classified and a theorem on connection of them with
point ones via PETs is also proved. It is shown that the known non-local
transformations between equations under consideration are nothing but PETs.
Action of PETs on sets of exact solutions of a fast diffusion equation is
investigated.Comment: 10 page
Potential Nonclassical Symmetries and Solutions of Fast Diffusion Equation
The fast diffusion equation is investigated from the
symmetry point of view in development of the paper by Gandarias [Phys. Lett. A
286 (2001) 153-160]. After studying equivalence of nonclassical symmetries with
respect to a transformation group, we completely classify the nonclassical
symmetries of the corresponding potential equation. As a result, new wide
classes of potential nonclassical symmetries of the fast diffusion equation are
obtained. The set of known exact non-Lie solutions are supplemented with the
similar ones. It is shown that all known non-Lie solutions of the fast
diffusion equation are exhausted by ones which can be constructed in a regular
way with the above potential nonclassical symmetries. Connection between
classes of nonclassical and potential nonclassical symmetries of the fast
diffusion equation is found.Comment: 13 pages, section 3 is essentially revise
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