Dispersionless integrable hierarchies and GL(2,R) geometry

Abstract

Paraconformal or GL(2) geometry on an n-dimensional manifold M is defined by a field of rational normal curves of degree n-1 in the projectivised cotangent bundle P T*M. Such geometry is known to arise on solution spaces of ODEs with vanishing W\"unschmann (Doubrov-Wilczynski) invariants. In this paper we discuss yet another natural source of GL(2) structures, namely dispersionless integrable hierarchies of PDEs (for instance the dKP hierarchy). In the latter context, GL(2) structures coincide with the characteristic variety (principal symbol) of the hierarchy. Dispersionless hierarchies provide explicit examples of various particularly interesting classes of GL(2) structures studied in the literature. Thus, we obtain torsion-free GL(2) structures of Bryant that appeared in the context of exotic holonomy in dimension four, as well as totally geodesic GL(2) structures of Krynski. The latter, also known as involutive GL(2) structures, possess a compatible affine connection (with torsion) and a two-parameter family of totally geodesic α-manifolds (coming from the dispersionless Lax equations), which makes them a natural generalisation of the Einstein-Weyl geometry. Our main result states that involutive GL(2) structures are governed by a dispersionless integrable system. This establishes integrability of the system of W\"unschmann conditions.