In this manuscript, we present the complete monotonicity of functions defined in terms of the poly-double gamma function \begin{align*} \psi_2^{(n)}(x) = (-1)^{n+1} n! \sum_{k=0}^{\infty} \dfrac{(1+k)}{(x+k)^{n+1}}, \quad x>0, \ n\geq 2. \end{align*} Consequently, we derive bounds for the ratio involving $\psi_2^{(n)}(x)$ and apply these bounds to establish the convexity, subadditivity and superadditivity of $\psi_2^{(n)}(x)$. In the process, various fundamental properties of $\psi_2^{(n)}(x)$ are established, including recurrence relations, integral representations, asymptotic expansions, complete monotonicity, and related inequalities. Graphical illustrations are provided to support the theoretical results.
Complete Monotonicity of the function involving derivatives of Barnes G-function
Deepshikha Mishra,A. Swaminathan
Published 2025 in Unknown venue
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2025
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Unknown venue
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2025-11-03
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Mathematics
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