On the Atkin and Swinnerton-Dyer type congruences for some truncated hypergeometric 1F0 series
Abstract
Let p be an odd prime and let n be a positive integer. For any positive integer α and m∈\1,2,3\, we have align* Σk=0pαn-1(12)kk!·(-4)kmk(m(m-4)p)Σk=0pα-1n-1(12)kk!·(-4)kmkp2α, align* where (x)k=x(x+1)·s(x+k-1) and (··) denotes the Legendre symbol. Also, when m=4, align* Σk=0pαn-1(-1)k·(12)kk! pΣk=0pα-1n-1(-1)k·(12)kk!p2α. align*
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