Transition of the semiclassical resonance widths across a tangential crossing energy-level

Abstract

We consider a 1D 2× 2 matrix-valued operator System0 with two semiclassical Schr\"odinger operators on the diagonal entries and small interactions on the off-diagonal ones. When the two potentials cross at a turning point with contact order n, the corresponding two classical trajectories at the crossing level intersect at one point in the phase space with contact order 2n. We compute the transfer matrix at this point between the incoming and outgoing microlocal solutions and apply it to the semiclassical distribution of resonances at the energy crossing level. It is described in terms of a generalized Airy function. This result generalizes FMW1 to the tangential crossing and AFH1 to the crossing at a turning point.