The tangent function and power residues modulo primes

Abstract

Let p be an odd prime, and let a be an integer not divisible by p. When m is a positive integer with p12m and 2 is an mth power residue modulo p, we determine the value of the product Πk∈ Rm(p)πakp, where Rm(p)=\0<k<p:\ k∈ Z\ is an\ mth power reside modulo\ p\. In particular, if p=x2+64y2 with x,y∈ Z, then Πk∈ R4(p)(1+π akp)=(-1)y(-2)(p-1)/8.