Arithmetic Properties Satisfied by a Recent Integer Partition Function of Dombos

Abstract

In recent work of Dombos, the set of integer partitions of n wherein the parts are either divisible by 4 or congruent to 1 6 arose in a natural way. In this work, we will denote the function which counts the number of such partitions of n by dp(n). Using elementary generating function manipulations and classical q--series results, we prove several congruences satisfied by dp(n). As an example, we prove that, for all α≥ 1 and all n ≥ 0, equation* dp ( 32α+ 1n + 7 · 9α+ 14 ) 0 3. equation*