Gabor analysis for Schrodinger equations and propagation of singularities

Abstract

We consider the Schr\"odinger equation equation* i ∂ u∂ t +Hu=0, H=a(x,D), equation* where the Hamiltonian a(z), z=(x,), is assumed real-valued and smooth, with bounded derivatives |∂α a(z)|≤ Cα, for every |α|≥ 2, z∈R2d. For such equation results are known concerning well-posedness of the Cauchy problem for initial data in L2(Rd) and local representation of the propagator eit H by means of Fourier integral operators. In the present paper we give a global expression for eitH in terms of Gabor analysis and we deduce boundedness in modulation spaces. Moreover, by using time-frequency techniques, we obtain a result of propagation of micro-singularities for eitH.