Quartic residues and sums involving 4k2k

Abstract

Let p be an odd prime and let m 0 p be a rational p-adic integer. In this paper we reveal the connection between quartic residues and the sum Σk=0[p/4]4k2k 1mk, where [x] is the greatest integer not exceeding x. Let q be a prime of the form 4k+1 and so q=a2+b2 with a,b∈ Z. When p ab(a2-b2)q, we show that for r=0,1,2,3, pq-14 ( ab)r q if and only if Σk=0[p/4]4k2k(a216q)k (-1)p2-18a+p-12· q-14( pq) ( ab)r p, where ( pq) is the Legendre symbol. We also establish congruences for Σk=0[p/4]4k2k 1mk p in the cases m=17,18,20,32,52,80,272.