Wolstenholme's theorem over Gaussian integers
Abstract
This paper establishes an extension of Wolstenholme's theorem to the ring of Gaussian integers Z[i]. For a prime p > 7, we prove that the sum Sp of inverses of Gaussian integers in the set \n+mi 1 ≤ n, m ≤ p-1, (p, mi+n)=1\ satisfies the congruence Sp 0 p4. We further generalize this result to higher-power sums Sp(k), demonstrating structured divisibility patterns modulo powers of p. We propose some conjectures generalising the connections between classical Wolstenholme's theorem and binomial coefficients. Special cases and irregularities for small primes (p ≤ 1000) are explicitly computed and tabulated.
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