On Cannon cone types and vector-valued multiplicative functions for genus-two-surface-group

Abstract

We consider Cannon cone types for a surface group of genus g, and we give algebraic criteria for establishing the cone type of a given cone and of all its sub-cones. We also re-prove that the number of cone types is exactly 8g(2g - 1)+1. In the genus 2 case, we explicitly provide the 48× 48 matrix of cone types, M, and we prove that M is primitive, hence Perron-Frobenius. Finally we define vector-valued multiplicative functions and we show how to compute their values by means of M.