On Gauss factorials and their connection to the cyclotomic λ-invariants of imaginary quadratic fields

Abstract

In this paper we establish a connection between the Gauss factorials and Iwasawa's cyclotomic λ-invariant for an imaginary quadratic field K. As a result, we will explain a corespondance between the 1-exceptional primes of Cosgrave and Dilcher for m = 3 and m = 4, and the primes for which the λ-invariants for K = Q(-3) and K = Q(i) is greater than one, respectively. We refer to the latter primes as ``non-trivial'' for their respective fields. We will also see that similar correspondences are true for K = Q(-d) when d = 2,5 and 6. As a corollary we find that primes p of the form p2 = 3x2 + 3x + 1 are always non-trivial for K = Q(-3). Last, we show that the non-trivial primes p for K = Q(i) and K = Q(-3) are characterized by modulo p2 congruences involving Euler and Glaisher numbers respectively.

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