Low dimensional bihamiltonian structures of topological type

Abstract

We construct local bihamiltonian structures from classical W-algebras associated to non-regular nilpotent elements of regular semisimple type in Lie algebras of type A2 and A3. They form exact Poisson pencil, admit a dispersionless limit and their leading terms define logarithmic or trivial Dubrovin-Frobenius manifolds. We calculate the corresponding central invariants which are expected to be constants. In particular, we get Dubrovin- Frobenius manifolds associated to the focused Schr\"odinger equation and Hurwitz space M0;1,0 and the corresponding bihamiltonian structures of topological type.