Arithmetic of p-adic curves and sections of geometrically abelian fundamental groups

Abstract

Let X be a proper, smooth, and geometrically connected curve of genus g(X) 1 over a p-adic local field. We prove that there exists an effectively computable open affine subscheme U⊂ X with the property that period (X)=1, and index (X) equals 1 or 2 (resp. period(X)=index (X)=1, assuming period (X)=index (X)), if (resp. if and only if) the exact sequence of the geometrically abelian fundamental group of U splits. We compute the torsor of splittings of the exact sequence of the geometrically abelian absolute Galois group associated to X, and give a new characterisation of sections of arithmetic fundamental groups of curves over p-adic local fields which are orthogonal to Pic0 (resp. Pic). As a consequence we observe that the non-geometric (geometrically pro-p) section constructed by Hoshi in [Hoshi] is orthogonal to Pic0.