Fractional powers of the parabolic Hermite operator. Regularity properties

Abstract

Let L= ∂t- x+|x|2. Consider its Poisson semigroup e-yL. For α >0 define the Parabolic Hermite-Zygmund spaces αL=\f: \:f∈ L∞(Rn+1)\:\; and \:\; \|∂yk e-yL f \|L∞(Rn+1)≤ Ck y-k+α,\;\: with \, k=[α]+1, y>0. \, with the obvious norm. It is shown that these spaces have a pointwise description of H\"older type. The fractional powers L β are well defined in these spaces and the following regularity properties are proved: eqnarray* α, β >0, \|L-β f\| α+2βL C \|f\| αL. eqnarray* eqnarray* 0< 2β < α, \|Lβ f\|_Lα-2β C \|f\|αL. eqnarray* Parallel results are obtained for the Hermite operator - +|x|2. The proofs use in a fundamental way the semigroup definition of the operators L β and (-+|x|2) β. The non-convolution structure of the operators produce an extra difficulty of the arguments.