hbar-expansion of KP hierarchy: Recursive construction of solutions

Abstract

The -dependent KP hierarchy is a formulation of the KP hierarchy that depends on the Planck constant and reduces to the dispersionless KP hierarchy as -> 0. A recursive construction of its solutions on the basis of a Riemann-Hilbert problem for the pair (L,M) of Lax and Orlov-Schulman operators is presented. The Riemann-Hilbert problem is converted to a set of recursion relations for the coefficients Xn of an -expansion of the operator X = X0 + X1 + 2 X2 +... for which the dressing operator W is expressed in the exponential form W = (X/). Given the lowest order term X0, one can solve the recursion relations to obtain the higher order terms. The wave function associated with W turns out to have the WKB form = (S/), and the coefficients Sn of the -expansion S = S0 + S1 + 2 S2 +..., too, are determined by a set of recursion relations. This WKB form is used to show that the associated tau function has an -expansion of the form τ = -2F0 + -1F1 + F2 + ...