New congruences for central binomial coefficients
Abstract
Let p be a prime and let a be a positive integer. In this paper we determine Σk=0pa-12kk+d/mk and Σk=1p-12kk+d/(kmk-1) modulo p for all d=0,...,pa, where m is any integer not divisible by p. For example, we show that if p=2,5 then Σk=1p-1(-1)k2kkk=-5Fp-( p5)p (mod p), where Fn is the n-th Fibonacci number and (-) is the Jacobi symbol. We also prove that if p>3 then Σk=1p-12kkk=8/9 p2Bp-3 (mod p3), where Bn denotes the n-th Bernoulli number.
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