Mapping properties of the Schr\"odinger maximal function on Damek--Ricci spaces

Abstract

For f ∈ S2( S)o, the collection of radial L2-Schwartz class functions on Damek--Ricci spaces S, we consider the Schr\"odinger maximal function, equation* S* f(x):= 0<t<4/Q2 |Stf(x)|\:,\:\:\:\:\:\:x∈ S\:, equation* corresponding to the Laplace--Beltrami operator with initial data f. We first obtain the complete description of the pairs (q, α) ∈ [1, ∞] × [0,∞) for which the estimate equation* \|S*f\|Lq(BR) CR\: \|f\|Hα( S)\:, equation* holds on geodesic balls BR, for all f ∈ S2( S)o. Our results are sharp and agree with the Euclidean case. We also prove that for all f ∈ S2( S)o, the following global estimate equation* \|S*f\|L2,∞( S) C\: \|f\|Hα( S),\:\:\:\:α>1/2, equation* holds true.

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