Quasi-finiteness of morphisms between character varieties
Abstract
Let f: Y X be a morphism between smooth complex quasi-projective varieties and Z be the closure of f(Y) with : Z X the inclusion map. We prove that a. for any field K, there exist finitely many semisimple representations \τi:π1(Z) GLN(k)\i=1,…, with k⊂ K the minimal field contained in K such that if :π1(X) GLN(K) is any representation satisfying [f*]=1, then [*]=[τi] for some i. b. The induced morphism between GLN-character varieties (of any characteristic) of π1(X) and π1(Y) is quasi-finite if Im[π1(Z) π1(X)] is a finite index subgroup of π1(X). These results extend the main results by Lasell in 1995 and Lasell-Ramachandran in 1996 from smooth complex projective varieties to quasi-projective cases with richer structures.
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