Reduction Operators of Linear Second-Order Parabolic Equations

TL;DR

This paper exhaustively classifies reduction operators and nonclassical symmetries of (1+1)-dimensional second order linear parabolic PDEs, exploring their reductions, transformations, and applications to exact solutions.

Contribution

It provides a comprehensive description of reduction operators, extends the no-go theorem to symmetry transformations, and links reduction operators to Darboux transformations.

Findings

Complete classification of reduction operators for the equations.

Extension of the no-go theorem to symmetry transformations.

Example demonstrating application to exact solutions.

Abstract

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.