A dynamical pairing between two rational maps

Abstract

Given two rational maps and on 1 of degree at least two, we study a symmetric, nonnegative-real-valued pairing <,> which is closely related to the canonical height functions h and h associated to these maps. Our main results show a strong connection between the value of <,> and the canonical heights of points which are small with respect to at least one of the two maps and . Several necessary and sufficient conditions are given for the vanishing of <,>. We give an explicit upper bound on the difference between the canonical height h and the standard height h in terms of <σ,>, where σ(x)=x2 denotes the squaring map. The pairing <σ,> is computed or approximated for several families of rational maps .