Unimodality of a refinement of Lassalle's sequence

Abstract

Defant, Engen, and Miller defined a refinement of Lassalle's sequence Ak+1 by considering uniquely sorted permutations of length 2k+1 whose first element is . They showed that each such sequence is symmetric in and conjectured that these sequences are unimodal. We prove that the sequences are unimodal.