Lebesgue points of measures and non tangential convergence of Poisson-Hermite integrals
Abstract
We study differentiability conditions on a complex measure at a point x0∈Rd, in relation with the boundary convergence at that point of the Poisson-type integral Pt=e-t L, where L=-+|x|2 is the Hermite operator. In particular, we show that x0 is a Lebesgue point for iff a slightly stronger notion than non-tangential convergence holds for Pt at x0. We also show non-tangential convergence when x0 is a σ-point of , a weaker notion than Lebesgue point, which for d=1 coincides with the classical Fatou condition.
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