On p-adic incomplete Mellin transforms and p-adic incomplete gamma-functions
Abstract
Let r be a non-zero rational number. In a paper in the Transactions of the AMS in 2023, O'Desky and Richman gave a construction of a p-adic incomplete gamma-function p(·,r) for each prime p for which |r - 1|p < 1. Aside from the special case where r = 1, only finitely many primes satisfy that condition for a given r, so it is desirable to lessen this restriction. In the present paper, we give a construction that works under the much weaker condition that |r|p = 1 using a p-adic integral transform we introduced in our paper of 2024 in Acta Arithmetica, which we interpret here as a p-adic analogue of an incomplete Mellin transform. For any given r, the condition |r|p = 1 holds for all except finitely many primes p. Our approach emphasizes the parallels between the complex and p-adic constructions, explaining how a p-adic integration-by-parts formula takes the place of complex integration by parts in the proof of the recurrence relations for the p-adic incomplete gamma-functions. We introduce a two-variable p-adic transform for the task, extending our earlier p-adic integral transform.
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