A congruence involving harmonic sums modulo pαqβ

Abstract

In 2014, Wang and Cai established the following harmonic congruence for any odd prime p and positive integer r, equation* Z(pr)-2pr-1Bp-3 ~( ~ pr), equation* where Z(n)=Σi+j+k=ni,j,k∈Pn1ijk and Pn denote the set of positive integers which are prime to n. In this note, we obtain a congruence for distinct odd primes p,~q and positive integers α,~β, equation* Z(pαqβ) 2(2-q)(1-1q3)pα-1qβ-1Bp-3pα equation* and the necessary and sufficient condition for equation* Z(pαqβ) 0pαqβ. equation* Finally, we raise a conjecture that for n>1 and odd prime power pα||n, α≥1, eqnarray Z(n) Πq|nq≠ p(1-2q)(1-1q3)(-2np)Bp-3pα. eqnarray