812 research outputs found
Reduction Operators of Linear Second-Order Parabolic Equations
The reduction operators, i.e., the operators of nonclassical (conditional)
symmetry, of (1+1)-dimensional second order linear parabolic partial
differential equations and all the possible reductions of these equations to
ordinary differential ones are exhaustively described. This problem proves to
be equivalent, in some sense, to solving the initial equations. The ``no-go''
result is extended to the investigation of point transformations (admissible
transformations, equivalence transformations, Lie symmetries) and Lie
reductions of the determining equations for the nonclassical symmetries.
Transformations linearizing the determining equations are obtained in the
general case and under different additional constraints. A nontrivial example
illustrating applications of reduction operators to finding exact solutions of
equations from the class under consideration is presented. An observed
connection between reduction operators and Darboux transformations is
discussed.Comment: 31 pages, minor misprints are correcte
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
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