A resolution of Kellner's conjectures on Wilson quotients
Abstract
Kellner expressed higher congruences for the Wilson quotient Wp of an odd prime p in terms of power sums of Fermat quotients, and recursively constructed certain p-independent polynomials ψν occurring in these congruences. In this note, we give a simple p-adic proof of these congruences using the p-adic logarithm and p-adic exponential function. We also provide an explicit generating function for the polynomials ψν in terms of complete Bell polynomials. This gives a direct derivation of Kellner's polynomials and allows us to resolve two conjectures stated by Kellner.
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