An Elementary Proof of a Conjecture of Saikia on Congruences for t--Colored Overpartitions

Abstract

The starting point for this work is the family of functions p-t(n) which counts the number of t--colored overpartitions of n. In recent years, several infinite families of congruences satisfied by p-t(n) for specific values of t≥ 1 have been proven. In particular, in his 2023 work, Saikia proved a number of congruence properties modulo powers of 2 for p-t(n) for t=5,7,11,13. He also included the following conjecture in that paper: \ % Conjecture: For all n≥ 0 and primes t, we have eqnarray* p-t(8n+1) & & 0 2, \\ p-t(8n+2) & & 0 4, \\ p-t(8n+3) & & 0 8, \\ p-t(8n+4) & & 0 2, \\ p-t(8n+5) & & 0 8, \\ p-t(8n+6) & & 0 8, \\ p-t(8n+7) & & 0 32. eqnarray* Using a truly elementary approach, relying on classical generating function manipulations and dissections, as well as proof by induction, we show that Saikia's conjecture holds for all odd integers t (not necessarily prime).