Odd primes p such that Sum_{a=1..p-1} a^(p-1) - (p-1)! == p (mod p^3). (The congruence holds mod p^2 for any odd prime p; see Lerch (1905).)
Marek Wolf has computed that if a 5th Lerch prime p exists, then 4496113 < p < 18816869 or 18977773 < p < 32452867 or p > 32602373.
Can a number be simultaneously a Lerch prime and a Wilson prime
A007540?
René Gy (see links) has shown that a number is simultaneously a Lerch prime and a Wilson prime if and only if it satisfies the congruence (p - 1)! + 1 == 0 (mod p^3). -
John Blythe Dobson, Feb 23 2018
Named after the Czech mathematician Mathias Lerch (1860-1922). -
Amiram Eldar, Jun 23 2021
