Uncertainty Principles for Fourier Multipliers

Abstract

The admittable Sobolev regularity is quantified for a function, w, which has a zero in the d--dimensional torus and whose reciprocal u=1/w is a (p,q)--multiplier. Several aspects of this problem are addressed, including zero--sets of positive Hausdorff dimension, matrix valued Fourier multipliers, and non--symmetric versions of Sobolev regularity. Additionally, we make a connection between Fourier multipliers and approximation properties of Gabor systems and shift--invariant systems. We exploit this connection and the results on Fourier multipliers to refine and extend versions of the Balian--Low uncertainty principle in these settings.