Lax pairs for higher-dimensional evolution PDEs and a 3+1 dimensional integrable generalization of the Burgers equation

M. Rudnev, A. V. Yurov, V. A. Yurov

Type: Article

Publication Date: 2006-08-31

Citations: 2

DOI: https://doi.org/10.1090/s0002-9939-06-08560-1

Abstract

We construct Lax pairs for general $d+1$ dimensional evolution equations in the form $u_t=F[u]$, where $F[u]$ depends on the field $u$ and its space derivatives. As an example we study a $3+1$ dimensional integrable generalization of the Burgers equation. We develop a procedure to generate some exact solutions of this equation, based on a class of discrete symmetries of the Darboux transformation type. In the one-dimensional limit, these symmetries reduce to the Cole-Hopf substitution for the Burgers equation. It is discussed how the technique can be used to construct exact solutions for higher-dimensional evolution PDEs in a broader context.

Locations

Proceedings of the American Mathematical Society - View - PDF

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