Some logarithmically completely monotonic functions and inequalities for multinomial coefficients and multivariate beta functions

Abstract: In the paper, the authors extend a function arising from the Bernoulli trials in probability and involving the gamma function to its largest ranges, find logarithmically complete monotonicity of these extended functions, and, in light of logarithmically complete monotonicity of these extended functions, derive some inequalities for multinomial coefficients and multivariate beta functions. These results recover, extend, and generalize some known conclusions.

“…In this paper, we use the notation For more information and recent developments of the gamma function Γ(z) and its logarithmic derivatives ψ (n) (z) for n ≥ 0, please refer to [1,Chapter 6], [25,Chapter 3], or recently published papers [14,18,20,21,31] and closely related references therein.…”

“…Recall from [11, Chapter XIII], [23, Chapter 1], [30, Chapter IV], and recently published papers [14,18,20,21] that (1) a function q(x) is said to be completely monotonic on an interval I if it is infinitely differentiable and (−1) n q (n) (x) ≥ 0 for n ≥ 0 on I. (2) a positive function q(x) is said to be logarithmically completely monotonic on an interval I ⊆ R if it is infinitely differentiable and its logarithm ln f (x) satisfies (−1) k [ln q(x)] (k) ≥ 0 for k ∈ N on I.…”

Increasing property and logarithmic convexity of functions involving Riemann zeta function

“…In this paper, we use the notation For more information and recent developments of the gamma function Γ(z) and its logarithmic derivatives ψ (n) (z) for n ≥ 0, please refer to [1,Chapter 6], [25,Chapter 3], or recently published papers [14,18,20,21,31] and closely related references therein.…”

“…Recall from [11, Chapter XIII], [23, Chapter 1], [30, Chapter IV], and recently published papers [14,18,20,21] that (1) a function q(x) is said to be completely monotonic on an interval I if it is infinitely differentiable and (−1) n q (n) (x) ≥ 0 for n ≥ 0 on I. (2) a positive function q(x) is said to be logarithmically completely monotonic on an interval I ⊆ R if it is infinitely differentiable and its logarithm ln f (x) satisfies (−1) k [ln q(x)] (k) ≥ 0 for k ∈ N on I.…”

Increasing property and logarithmic convexity of functions involving Riemann zeta function

“…There are a number of papers and mathematicians dedicated to investigation of complete monotonicity of some functions involving the gamma and polygamma functions. For more information and details, please refer to the papers [2,9,11,15] and closely related references therein.…”

Monotonicity and complete monotonicity of two functions constituted via three derivatives of a function involving trigamma function

“…Motivated by the papers [15,28] and related texts in the survey article [19], by establishing the inequality…”

A ratio of many gamma functions and its properties with applications