Arithmetic Identities and Congruences for Partition Triples with 3-cores
Abstract
Let B3(n) denote the number of partition triples of n where each partition is 3-core. With the help of generating function manipulations, we find several infinite families of arithmetic identities and congruences for B3(n). Moreover, let ω (n) denote the number of representations of a nonnegative integer n in the form x12+x22+x32+3y12+3y22+3y32 with x1,x2,x3,y1,y2,y3∈ Z. We find three arithmetic relations between B3(n) and ω (n), such as ω (6n+5)=4B3(6n+4).
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