Abstract
We study a two-dimensional discrete directional maximal operator along the set of the prime numbers. We show existence of a set of vectors, which are lattice points in a sufficiently large annulus, for which the $\ell^2$ norm of the associated maximal operator, with supremum taken over all large scales, grows with an epsilon power in the number of vectors. This paper is a follow-up to a prior work on the discrete directional maximal operator along the integers by the first and third author.
Citation
Laura Cladek. Polona Durcik. Ben Krause. José Madrid. "Directional maximal function along the primes." Publ. Mat. 65 (2) 841 - 858, 2021. https://doi.org/10.5565/PUBLMAT6522113
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