Polynomially oscillatory multipliers on Gelfand-Shilov spaces

Abstract

We study continuity of the multiplier operator ei q acting on Gelfand--Shilov spaces, where q is a polynomial on Rd of degree at least two with real coefficients. In the parameter quadrant for the spaces we identify a wedge that depends on the polynomial degree for which the operator is continuous. We also show that in a large part of the complement region the operator is not continuous in dimension one. The results give information on well-posedness for linear evolution equations that generalize the Schr\"odinger equation for the free particle.

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