Characterization of smooth symbol classes by Gabor matrix decay

Abstract

For m∈R we introduce the symbol classes Sm, m∈R, consisting of smooth functions σ on R2d such that |∂α σ(z)|≤ Cα (1+|z|2)m/2, z∈R2d, and we show that can be characterized by an intersection of different types of modulation spaces. In the case m=0 we recapture the H\"ormander class S00,0 that can be obtained by intersection of suitable Besov spaces as well. Such spaces contain the Shubin classes m, 0<≤1, and can be viewed as their limit case =0. We exhibit almost diagonalization properties for the Gabor matrix of τ-pseudodifferential operators with symbols in such classes, extending the characterization proved by Gr\"ochenig and Rzeszotnik. Finally, we compute the Gabor matrix of a Born-Jordan operator, which allows to prove new boundedness results for such operators.