Strichartz Estimates for the (k,a)-Generalized Laguerre Operators
Abstract
In this paper, we prove Strichartz estimates for the (k,a)-generalized Laguerre operators a-1(-|x|2-ak+|x|a) which were introduced by Ben Sa\"d-Kobayashi-Orsted, and for the operators |x|2-ak. Here k denotes a non-negative multiplicity function for the Dunkl Laplacian k and a denotes a positive real number satisfying certain conditions. The cases a=1,2 were studied previously. We consider more general cases here. The proof depends on symbol-type estimates of special functions and a discrete analog of the stationary phase theorem inspired by the work of Ionescu-Jerison.
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