Wave propagation on Euclidean surfaces with conical singularities. I: Geometric diffraction

Abstract

We investigate the singularities of the trace of the half-wave group, Tr \, e-it, on Euclidean surfaces with conical singularities (X,g). We compute the leading-order singularity associated to periodic orbits with successive degenerate diffractions. This result extends the previous work of the third author Hil and the two-dimensional case of the work of the first author and Wunsch ForWun as well as the seminal result of Duistermaat and Guillemin DuiGui in the smooth setting. As an intermediate step, we identify the wave propagators on X as singular Fourier integral operators associated to intersecting Lagrangian submanifolds, originally developed by Melrose and Uhlmann MelUhl.