Differential Forms on Hyperelliptic Curves with Semistable Reduction

Abstract: Let $C$ be a hyperelliptic curve over a local field $K$ with odd residue characteristic, defined by some affine Weierstrass equation $y^2=f(x)$. We assume that $C$ has semistable reduction and denote by $\mathcal{X} \rightarrow \textrm{Spec}\, \mathcal{O}K$ its minimal regular model with relative dualizing sheaf $\omega{\mathcal{X}/ \mathcal{O}K}$. We show how to directly read off a basis for $H^0(\mathcal{X},\omega{\mathcal{X}/\mathcal{O}K})$ from the cluster picture of the roots of $f$. Furthermore we give a formula for the valuation of $\lambda$ such that $\lambda \cdot \frac{dx}{y} \land \dots \land x^{g-1}\frac{dx}{y}$ is a generator for $\det H^0(\mathcal{X},\omega{\mathcal{X}/\mathcal{O}_K})$.