On integrals over a convex set of the Wigner distribution
Abstract
We provide an example of a normalized L2( R) function u such that its Wigner distribution W(u,u) has an integral >1 on the square [0,a]×[0,a] for a suitable choice of a. This provides a negative answer to a question raised by P. Flandrin in 1988. Our arguments are based upon the study of the Weyl quantization of the indicatrix of R+× R+ along with a precise numerical analysis of its discretization.
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