Description
A hyperbolic 0-metric on a compact surface with boundary is a
hyperbolic metric on the interior, with a boundary behaviour similar to
that of the Poincare metric on the upper half plane. We show that the
infinite-dimensional Teichmueller space of such metrics has a natural
symplectic structure, and is an example of a Hamiltonian Virasoro space.
Based on joint work with Anton Alekseev.
