We prove continuity results for Fourier integral operators with symbols in modulation spaces, acting between modulation spaces. The phase functions belong to a class of nondegenerate generalized quadratic forms that includes Schrödinger propagators and pseudodifferential operators. As a byproduct we obtain a characterization of all exponents $p,q,r_1,r_2,t_1,t_2 \in [1,\infty]$ of modulation spaces such that a symbol in $M^{p,q}$ gives a pseudodifferential operator that is continuous from $M^{r_1,r_2}$ into $M^{t_1,t_2}$.
Schrödinger type propagators, pseudodifferential operators and modulation spaces
CORDERO, Elena;
2013-01-01
Abstract
We prove continuity results for Fourier integral operators with symbols in modulation spaces, acting between modulation spaces. The phase functions belong to a class of nondegenerate generalized quadratic forms that includes Schrödinger propagators and pseudodifferential operators. As a byproduct we obtain a characterization of all exponents $p,q,r_1,r_2,t_1,t_2 \in [1,\infty]$ of modulation spaces such that a symbol in $M^{p,q}$ gives a pseudodifferential operator that is continuous from $M^{r_1,r_2}$ into $M^{t_1,t_2}$.
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