"Quantization" of higher hamiltonian analogues of the Painleve I and Painleve II equations with two degrees of freedom

Abstract

We construct a solution of an analog of the Schr\"odinger equation for the Hamiltonian HI (z, t, q1, q2, p1, p2) corresponding to the second equation P12 in the Painleve I hierarchy. This solution is produced by an explicit change of variables from a solution of the linear equations whose compatibility condition is the ordinary differential equation P12 with respect to z. This solution also satisfies an analog of the Schr\"odinger equation corresponding to the Hamiltonian HII (z, t, q1, q2, p1, p2) of Hamiltonian system with respect to t which is compatible with P12. A similar situation occurs for the P22 equation in the Painleve II hierarchy.