Analogues of Harglotz-Zagier-Novikov function
Abstract
Recently, Choie and Kumar extensively studied the Herglotz-Zagier-Novikov function F(z;u,v), defined as align* F(z;u,v) = ∫01 (1-utz)v-1-t dt, for Re(z)>0. align* 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, align* F(z;u,v,w) &=∫01 (1-utz)(1-wtz)v-1-tdt, \\ Fk(z;u,v) &= ∫01 k(1-utz)v-1-t \, dt, align* 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.
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