Zariski density and finite quotients of mapping class groups

Abstract

Our main result is that the image of the quantum representation of a central extension of the mapping class group of the genus g≥ 3 closed orientable surface at a prime p≥ 5 is a Zariski dense discrete subgroup of some higher rank algebraic semi-simple Lie group Gp defined over . As an application we find that, for any prime p≥ 5 a central extension of the genus g mapping class group surjects onto the finite groups Gp(/q), for all but finitely many primes q. This method provides infinitely many finite quotients of a given mapping class group outside the realm of symplectic groups.