Approximations of pseudo-differential flows

Abstract

Given a classical symbol M of order zero, and associated semiclassical operators op(M), we prove that the flow of op(M) is well approximated, in time O(| |), by a pseudo-differential operator, the symbol of which is the flow (t M) of the symbol M. A similar result holds for non-autonomous equations, associated with time-dependent families of symbols M(t). This result was already used, by the author and co-authors, to give a stability criterion for high-frequency WKB approximations, and to prove a strong Lax-Mizohata theorem. We give here two further applications: sharp semigroup bounds, implying nonlinear instability under the assumption of spectral instability at the symbolic level, and a new proof of sharp Garding inequalities.