On sums of Ap\'ery polynomials and related congruences

Abstract

The Ap\'ery polynomials are given by An(x)=Σk=0n nk2n+kk2xk\ \ (n=0,1,2,…). (Those An=An(1) are Ap\'ery numbers.) Let p be an odd prime. We show that Σk=0p-1(-1)kAk(x)Σk=0p-12kk316kxkp2, and that Σk=0p-1Ak(x)( xp)Σk=0p-14kk,k,k,k(256x)kp for any p-adic integer x 0 p. This enables us to determine explicitly Σk=0p-1(1)kAk mod p, and Σk=0p-1(-1)kAk mod p2 in the case p 23. Another consequence states that Σk=0p-1(-1)kAk(-2)cases4x2-2pp2&if\ p=x2+4y2\ (x,y∈ Z),\\0p2&if\ p34.cases We also prove that for any prime p>3 we have Σk=0p-1(2k+1)Ak p+ 76p4Bp-3p5 where B0,B1,B2,… are Bernoulli numbers.