A combinatorial proof of a relationship between maximal (2k-1,2k+1) and (2k-1,2k,2k+1)-cores

Abstract

Integer partitions which are simultaneously t--cores for distinct values of t have attracted significant interest in recent years. When s and t are relatively prime, Olsson and Stanton have determined the size of the maximal (s,t)-core s,t. When k≥ 2, a conjecture of Amdeberhan on the maximal (2k-1,2k,2k+1)-core 2k-1,2k,2k+1 has also recently been verified by numerous authors. In this work, we analyze the relationship between maximal (2k-1,2k+1)-cores and maximal (2k-1,2k,2k+1)-cores. In previous work, the first author noted that, for all k≥ 1, \, 2k-1,2k+1\, = 4 \, 2k-1,2k,2k+1\, and requested a combinatorial interpretation of this unexpected identity. Here, using the theory of abaci, partition dissection, and elementary results relating triangular numbers and squares, we provide such a combinatorial proof.