A criterion for quadraticity of a representation of the fundamental group of an algebraic variety

Abstract

Let be a finitely presented group and G a linear algebraic group over R. A representation :→ G(R) can be seen as an R-point of the representation variety R(, G). It is known from the work of Goldman and Millson that if is the fundamental group of a compact K\"ahler manifold and has image contained in a compact subgroup then is analytically defined by homogeneous quadratic equations in R(, G). When X is a smooth complex algebraic variety, we study a certain criterion under which this same conclusion holds.