On Lp-boundedness of pseudo-differential operators of Sj\"ostrand's class

Abstract

We extended the known result that symbols from modulation spaces M∞,1(R2n), also known as the Sj\"ostrand's class, produce bounded operators in L2(Rn), to general Lp boundedness at the cost of lost of derivatives. Indeed, we showed that pseudo-differential operators acting from Lp-Sobolev spaces Lps(Rn) to Lp(Rn) spaces with symbols from the modulation space M∞,1(R2n) are bounded, whenever s≥ n|1/p-1/2|. This estimate is sharp for all 1≤ p≤∞.