On completely integrable polynomial PDEs arising from Sturm-Liouville differential equation using evolutionary vessels. KdV Hierarchy

Abstract

In this work we present a scheme for construction of solutions for evolutionary PDEs of some polynomial types q't = P(q,q'x,...), where P is a polynomial in a finite number of variables. This scheme is a generalization of the existing technique for solution of completely integrable PDEs using Inverse Scattering of the Sturm-Liouville differential equation. The KdV equation q't = - 3/2 q q'x + 1/4 q"'xxx is a special case, corresponding to type 1 evolutionary equations. We present a complete solution of type 0, and present a KdV hierarchy corresponding to infinite number of polynomial evolutionary equations rather for β = 1/2 ∫0x q(y,t)dy then for q(x,t) itself, of the form β't = in bn(βx'), where b0 = -1/4 β"'xxx + 3/2 (β'x)2 corresponds to the KdV equation and 4 (bn+1)'x = -i (bn)xxx"' + 4i (β'xbn)'x. Soliton solutions (i.e. involving pure exponents only) are presented for each such evolutionary equation, demonstrating a "simplicity" of the solutions construction.