Almost everywhere convergence of Bochner--Riesz means for the twisted Laplacian
Abstract
Let L denote the twisted Laplacian in Cd. We study almost everywhere convergence of the Bochner--Riesz mean Sδt( L) f of f∈ Lp( Cd) as t ∞, which is an expansion of f in the special Hermite functions. For 2 p ∞, we obtain the sharp range of the summability indices δ for which the convergence of Sδt( L) f holds for all f∈ Lp( Cd).
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