Unimodality of k-Regular Partitions into Distinct Parts with Bounded Largest Part

Abstract

A k-regular partition into distinct parts is a partition into distinct parts with no part divisible by k. In this paper, we provide a general method to establish the unimodality of k-regular partition into distinct parts where the largest part is at most km+k-1. Let dk,m(n) denote the number of k-regular partition of n into distinct parts where the largest part is at most km+k-1. In line with this method, we show that d4,m(n)≥ d4,m(n-1) for m≥ 0, 1≤ n≤ 3(m+1)2 and n≠ 4 and d8,m(n)≥ d8,m(n-1) for m≥ 2 and 1≤ n≤ 14(m+1)2. When 5≤ k≤ 10 and k≠ 8, we show that dk,m(n)≥ dk,m(n-1) for m≥ 0 and 1≤ n≤ k(k-1)(m+1)24.