A note on n! modulo p
Abstract
Let p be a prime, >0 and 0<L+1<L+N < p. We prove that if p1/2+< N <p1-, then \#\n!\!\!\! p;\,\, L+1 n L+N\ > c (N N)1/2,\,\, c=c()>0. We use this bound to show that any λ 0 p can be represented in the form λ n1!...n7! p, where ni=o(p11/12). This slightly refines the previously known range for ni.
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