Teichm\"uller spaces as degenerated symplectic leaves in Dubrovin--Ugaglia Poisson manifolds

Abstract

In this paper we study the Goldman bracket between geodesic length functions both on a Riemann surface g,s,0 of genus g with s=1,2 holes and on a Riemann sphere 0,1,n with one hole and n orbifold points of order two. We show that the corresponding Teichm\"uller spaces Tg,s,0 and T0,1,n are realised as real slices of degenerated symplectic leaves in the Dubrovin--Ugaglia Poisson algebra of upper--triangular matrices S with 1 on the diagonal.