Complete monotonicity of a ratio of gamma functions and some combinatorial inequalities for multinomial coefficients

Abstract

For m,n∈ N, let 0 < αi,βj,λij ≤ 1 be such that Σj=1n λij = αi, Σi=1m λij = βj, and Σi=1m αi = Σj=1n βj ≤ 1. We prove that the ratio of gamma functions equation* -15mmt Πi=1m (αi t + 1) Πj=1n (βj t + 1)Πi=1m Πj=1n (λij t + 1) equation* is logarithmically completely monotonic on (0,∞). This result complements the logarithmically complete monotonicity of multinomial probabilities shown in Ouimet (2018), Qi et al (2018), and the recent survey of Qi & Argawal (2019) on the complete monotonicity of functions related to ratios of gamma functions. As a consequence of the log-convexity, we obtain new combinatorial inequalities for multinomial coefficients.