Hardy inequalities for fractional (k,a)-generalized harmonic oscillator

Abstract

In this paper, we will define a-deformed Laguerre operators La,α and a-deformed Laguerre holomorphic semigroups on L2((0,∞),dμa,α). Then we give a spherical harmonic expansion, which reduces to the Bochner-type identity when taking the boundary value z=π i2, of the (k,a)-generalized Laguerre semigroup introduced by S. Ben Sa\"id, T. Kobayashi and B. rsted. And then we prove a Hardy inequality for fractional powers of the a-deformed Dunkl harmonic oscillator k,a:=|x|2-ak-|x|a using this expansion. When a=2, the fractional Hardy inequality reduces to that of Dunkl--Hermite operators given by \'O. Ciaurri, L. Roncal and S. Thangavelu. The operators La,α also give a tangible characterization of the radial part of the (k,a)-generalized Laguerre semigroup on each k-spherical component Hkm(RN) for λk,a,m:=2m+2 k+N-2a≥ -1/2 defined via decomposition of unitary representation.