Extension of Localisation Operators to Ultradistributional Symbols With Super-Exponential Growth

Abstract

In the Gelfand-Shilov setting, the localisation operator A1,2a is equal to the Weyl operator whose symbol is the convolution of a with the Wigner transform of the windows 2 and 1. We employ this fact, to extend the definition of localisation operators to symbols a having very fast super-exponential growth by allowing them to be mappings from D\Mp\( Rd) into D'\Mp\( Rd), where Mp, p∈ N, is a non-quasi-analytic Gevrey type sequence. By choosing the windows 1 and 2 appropriately, our main results show that one can consider symbols with growth in position space of the form ((l|·|q)), l,q>0.