Wieferich Primes and a mod p Leopoldt Conjecture

Abstract

We consider questions in Galois cohomology which arise by considering mod p Galois representations arising from automorphic forms. We consider a Galois cohomological analog for the standard heuristics about the distribution of Wieferich primes, i.e. prime p such that 2p-1 is 1 mod p2. Our analog relates to asking if in a compatible system of Galois representations, for almost all primes p, the residual mod p representation arising from it has unobstructed deformation theory. This analog leads in particular to formulating a mod p analog for almost all primes p of the classical Leopoldt conjecture, which has been considered previously by G. Gras. Leopoldt conjectured that for a number field F, and a prime p, the p-adic regulator RF,p is non-zero. The mod p analog is that for a fixed number field F, for almost all primes p, the p-adic regulator RF,p is a unit at p.