Averages and maximal averages over Product j-varieties in finite fields
Abstract
We study both averaging and maximal averaging problems for Product j-varieties defined by j=\x∈ Fqd: Πk=1d xk=j\ for j∈ Fq*, where Fqd denotes a d-dimensional vector space over the finite field Fq with q elements. We prove the sharp Lp Lr boundedness of averaging operators associated to Product j-varieties. We also obtain the optimal Lp estimate for a maximal averaging operator related to a family of Product j-varieties \j\j∈ Fq*.
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