Non-autonomous reductions of the KdV equation and multi-component analogs of the Painlev\'e equations P34 and P3

Abstract

We study reductions of the Korteweg--de Vries equation corresponding to stationary equations for symmetries from the noncommutative subalgebra. An equivalent system of n second-order equations is obtained, which reduces to the Painlev\'e equation P34 for n=1. On the singular line t=0, a subclass of special solutions is described by a system of n-1 second-order equations, equivalent to the P3 equation for n=2. For these systems, we obtain the isomonodromic Lax pairs and B\"acklund transformations which form the group Zn2× Zn.