Equivalence criteria for the two-term functional equations for Herglotz-Zagier functions
Abstract
For any integer a and non-negative integer b, we define a Herglotz--Zagier (HZ) type function Fa,b(x) by an absolutely convergent series involving the Digamma function ψ(x). For each such Fa,b(x), we associate an integer weight. In the literature, Ramanujan, Guinand, Zagier, Vlasenko-Zagier have derived two-term functional equations for some HZ type functions of positive weights. In this paper, we study a class of HZ type function associated with negative weights, and obtain their two-term functional equations. Parallelly, we associate an integer weight to the Kronecker limit type formula for the generalized Mordell--Tornheim zeta function Θ(r,s,t,x). We establish that any two-term functional equation for HZ type function is equivalent to a Kronecker limit type formula of Θ(r,s,t,x), preserving weight. As a consequence, we derive new Kronecker limit type formulas and obtain a new special value of the Mordell--Tornheim zeta function ζMT(r,s,t). We also obtain results of Ramanujan, Guinand, Zagier, and Vlasenko-Zagier as consequences, to show that the Mordell--Tornheim zeta function lies centrally between many known modular relations.
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