Arithmetic genus inequalities with an application to sums of squares

Abstract

We show variants of the genus inequality for the irreducible components of the special fiber of an arithmetic curve over a henselian discrete valuation ring of residue characteristic zero that take into account the non-existence of rational, respectively real points on the the components. We then apply this inequality to obtain the bound 2ng (respectively 2n(g+1)) on the totally positive sum-of-two-squares index in the function field of a curve of genus g over the field of n-fold iterated real Laurent series with (respectively without) real points. The bound 2n(g+1) had been previously known only for hyperelliptic curves.