Tau function and Virasoro action for the nxn KdV hierarchy

Abstract

This is the third in a series of papers attempting to describe a uniform geometric framework in which many integrable systems can be placed. A soliton hierarchy can be constructed from a splitting of an infinite dimensional group L as positive and negative subgroups L+, L- and a commuting sequence in the Lie algebra of L+. Given f in L-, there is a formal inverse scattering solution uf of the hierarchy. When there is a 2 co-cycle that vanishes on both subalgebras of L+ and L-, Wilson constructed for each f in L- a tau function tauf for the hierarchy. In this third paper, we prove the following results for the nxn KdV hierarchy: (1) The second partials of ln(tauf) are differential polynomials of the formal inverse scattering solution uf. Moreover, uf can be recovered from the second partials of ln(tauf). (2) The natural Virasoro action on ln(tauf) constructed in the second paper is given by partial differential operators in ln(tauf). (3) There is a bijection between phase spaces of the nxn KdV hierarchy and the Gelfand-Dickey (GDn) hierarchy on the space of order n linear differential operators on the line so that the flows in these two hierarchies correspond under the bijection. (4) Our Virasoro action on the nxn KdV hierarchy is constructed from a simple Virasoro action on the negative group. We show that it corresponds to the known Virasoro action on the GDn hierarchy under the bijection.