Rigidity of Fibonacci representations of mapping class groups

Abstract

We prove that level 5 Witten-Reshetikhin-Turaev SO(3) quantum representations, also known as the Fibonacci representations, of mapping class groups are locally rigid. More generally, for any prime level , we prove that the level SO(3) quantum representations are locally rigid on all surfaces of genus g≥ 3 if and only if they are locally rigid on surfaces of genus 3 with at most 3 boundary components. This reduces local rigidity in prime level to a finite number of cases.