Pressure path metrics on parabolic families of polynomials

Abstract

Let be a subfamily of the moduli space of degree D2 polynomials defined by a finite number of parabolic relations. Let be a bounded stable component of with the property that all critical points are attracted by either the persistent parabolic cycles or by attracting cycles in C. We construct a positive semi-definite pressure form on and show that it defines a path metric on . This provides a counterpart in complex dynamics of the pressure metric on cusped Hitchin components recently studied by Kao and Bray-Canary-Kao-Martone.