Streamlined WZ method proofs of Van Hamme supercongruences
Abstract: Using the WZ method to prove supercongruences critically depends on an inspired WZ pair choice. This paper demonstrates a procedure for finding WZ pair candidates to prove a given supercongruence. When suitable WZ pairs are thus obtained, coupling them with the $p$-adic approximation of $\Gamma_p$ by Long and Ramakrishna enables uniform proofs for the Van Hamme supercongruences B.2, C.2, D.2, E.2, F.2, G.2, and H.2. This approach also yields the known extensions of G.2 modulo $p4$, and of H.2 modulo $p3$ when $p$ is $3$ modulo $4$. Finally, the Van Hamme supercongruence I.2 is shown to be a special case of the WZ method where Gosper's algorithm itself succeeds.
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