Wolstenholme and Vandiver primes
Abstract
A prime p is a Wolstenholme prime if 2pp2 mod p4, or, equivalently, if p divides the numerator of the Bernoulli number Bp-3; a Vandiver prime p is one that divides the Euler number Ep-3. Only two Wolstenholme primes and eight Vandiver primes are known. We increase the search range in the first case by a factor of 10, and show that no additional Wolstenholme primes exist up to 1011, and in the second case by a factor of 20, proving that no additional Vandiver primes occur up to this same bound. To facilitate this, we develop a number of new congruences for Bernoulli and Euler numbers mod p that are favorable for computation, and we implement some highly parallel searches using GPUs.
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