P-adic incomplete gamma functions and Artin-Hasse-type series
Abstract
We define and study a p-adic analogue of the incomplete gamma function related to Morita's p-adic gamma function. We also discuss a combinatorial identity related to the Artin-Hasse series, which is a special case of the exponential principle in combinatorics. From this we deduce a curious p-adic property of |Hom (G,Sn)| for a topologically finitely generated group G, using a characterization of p-adic continuity for certain functions f Z>0 Qp due to O'Desky-Richman. In the end, we give an exposition of some standard properties of the Artin-Hasse series.
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