Orthonormal sequences in L2(Rd) and time frequency localization

Abstract

We study uncertainty principles for orthonormal bases and sequences in L2(d). As in the classical Heisenberg inequality we focus on the product of the dispersions of a function and its Fourier transform. In particular we prove that there is no orthonormal basis for L2() for which the time and frequency means as well as the product of dispersions are uniformly bounded. The problem is related to recent results of J. Benedetto, A. Powell, and Ph. Jaming. Our main tool is a time frequency localization inequality for orthonormal sequences in L2(d). It has various other applications.