Please use this identifier to cite or link to this item: https://dspace.iiti.ac.in/handle/123456789/18721
Title: Analogues of Herglotz-Zagier-Novikov function
Authors: Bansal, Diksha Rani
Maji, Bibekananda
Keywords: Dilogarithm;Evaluations of integrals;Herglotz-Zagier-Novikov function;Kronecker limit formula;Polylogarithm
Issue Date: 2025
Publisher: Hardy-Ramanujan Society
Citation: Bansal, D. R., Maji, B., & Singh, P. (2025). Analogues of Herglotz-Zagier-Novikov function. Hardy-Ramanujan Journal, 48, 38–60. https://doi.org/10.46298/hrj.2026.17912
Abstract: Recently, Choie and Kumar extensively studied the Herglotz-Zagier-Novikov function F(z
u, v), defined as ∫1 F(z
u, v) = 0 log(1 − utz ) v−1 dt, for Re(z) > 0. − t They obtained two-term, three-term and six-term functional equations for F(z
u, v) and also evaluated special values in terms of di-logarithmic functions. Motivated from their work, we study the following two integrals, ∫1 log(1 − utz ) log(1 − wtz ) F(z
u, v, w) = 0 v−1 dt, − t ∫1 logk (1 − utz ) Fk (z
u, v) = 0 v−1 dt, − t for Re(z) > 0 and k ∈ N. For k = 1, the integral Fk (z
u, v) reduces to F(z
u, v). This allows us to recover the properties of F(z
u, v) by studying the properties of Fk (z
u, v). We evaluate special values of these two functions in terms of poly-logarithmic functions. © 2025, Hardy-Ramanujan Society. All rights reserved.
URI: https://dx.doi.org/10.46298/hrj.2026.17912
https://dspace.iiti.ac.in:8080/jspui/handle/123456789/18721
ISSN: 2804-7370
Type of Material: Journal Article
Appears in Collections:Department of Mathematics

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