Symmetries in the fourth Painleve equation and Okamoto polynomials
Abstract
We propose a new representation of the fourth Painlevé equation in which the
A
(1)
2
-symmetries become clearly visible. By means of this representation, we clarify the internal relation between the fourth Painlevé equation and the modified KP hierarchy. We obtain in particular a complete description of the rational solutions of the fourth Painlevé equation in terms of Schur functions. This implies that the so-called Okamoto polynomials, which arise from the
τ
-functions for rational solutions, are in fact expressible by the 3-reduced Schur functions.