Kontsevich-Zagier Integrals for Automorphic Green's Functions. II

We introduce interaction entropies, which can be represented as logarithmic couplings of certain cycles on a class of algebraic curves of arithmetic interest. In particular, via interaction entropies for Legendre-Ramanujan curves $ Y^n=(1-X)^{n-1}X(1-\alpha X)$ ($ n\in\{6,4,3,2\}$), we reformulate the Kontsevich-Zagier integral representations of weight-4 automorphic Green's functions $ G_2^{\mathfrak H/\overline{\varGamma}_0(N)}(z_1,z_2)$ ($N=4\sin^2(\pi/n )\in\{1,2,3,4\}$), in a geometric and information-theoretic context. Applications of these entropy formulae bring us new perspectives on our previously reported results about automorphic self-energies and Epstein zeta functions, as well as furnish us with certain analytic inequalities involving complete elliptic integrals.