A note on arithmetic congruences
Abstract
By analyzing the coefficients of the power series defining the Kubota--Leopoldt p-adic L-function associated to the non-trivial character of a real quadratic field, we prove a congruence of Ankeny--Artin--Chowla-type for prime power modulus. Additionally, we show how some classical congruences relating Bernoulli numbers and Wilson quotients fit naturally into the theory of the p-adic Riemann zeta function.
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