Models and Integral Differentials of Hyperelliptic Curves

Abstract

Let C: y2=f(x) be a hyperelliptic curve of genus g≥ 1, defined over a complete discretely valued field K, with ring of integers OK. Under certain conditions on C, mild when residue characteristic is not 2, we explicitly construct the minimal regular model with normal crossings C/OK of C. In the same setting we determine a basis of integral differentials of C, that is an OK-basis for the global sections of the relative dualising sheaf ωC/OK.