An extension of Wilson's Theorem
Abstract
Let N[k] be the multiset containing the n-1k products of k-subsets of \1,…, n-1\. We show that if n≥ (2c+3)2, then gather*((-1)c+ΣM∈ N[n-1-c]M)·(c+1) 0n,gather* if and only if n=(c+1)p, where p is prime. This provides a combinatorial extension of Wilson's Theorem, which is the special case where c=0.
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