On the sequence n! p
Abstract
We prove, that the sequence 1!, 2!, 3!, … produces at least (2 + o(1))p distinct residues modulo prime p. Moreover, factorials on an interval I ⊂eq \0, 1, …, p - 1\ of length N > p7/8 + produce at least (1 + o(1))p distinct residues modulo p. As a corollary, we prove that every non-zero residue class can be expressed as a product of seven factorials n1! … n7! modulo p, where ni = O(p6/7+) for all i=1,…,7, which provides a polynomial improvement upon the preceding results.
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