Galois actions on fundamental groups of curves and the cycle C-C-
Abstract
Suppose that C is a smooth, projective, geometrically connected curve of genus g > 2 defined over a number field K. Suppose that x is a K-rational point of C. Denote the Lie algebra of the unipotent completion (over Qell) of the fundamental group of the corresponding complex analytic curve by p(C,x). This is acted on by both GK (the Galois group of K) and Gamma, the mapping class group of the pointed complex curve. In this paper we show that the algebraic cycle Cx-Cx- in the jacobian of C controls the size of the image of GK in Aut p(C,x). More precisely, we give necessary and sufficient conditions, in terms of two Galois cohomology classes determined by this cycle, for the Zariski closure of the image of GK in Aut p(C,x) to contain the image of the mapping class group. We also prove an equivalent version for the pro-ell fundamental group, an unpointed version, and a Galois analogue of the Harris-Pulte Theorem.
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