Almost everywhere convergence of Bochner-Riesz means for the Hermite type Laguerre expansions

Abstract

Consider the space R+d=(0,∞)d equipped with Euclidean distance and the Lebesgue measure. For every α=(α1,...,αd)∈[-1/2,∞)d, we consider the Hermite-Laguerre operator Lα=-+ x2+Σi=1d(αj2-14)1xi2. In this paper we study almost everywhere convergence of the Bochner-Riesz means associated with Lα which is defined as SRλ(Lα)f(x)=Σn=0∞(1-4n+2α1+2dR2)+λPnf(x). Here Pnf(x) is the n-th Laguerre spectral projection operator and α1 denotes Σi=1dαi. For 2≤ p<∞, we prove that \[ R ∞ SRλ(Lα)f = f a.e. \] for all f∈ Lp(R+d) provided that λ>λ(p)/2 and λ(p)=\d(1/2-1/p)-1/2,0\. Conversely, we show that the convergence generally fails if λ<λ(p)/2 in the sense that there exists f∈ Lp(R+d) for 2d/(d-1)< p such that the convergence fails.