On Genus Two Riemann Surfaces Formed from Sewn Tori

Abstract

We describe the period matrix and other data on a higher genus Riemann surface in terms of data coming from lower genus surfaces via an explicit sewing procedure. We consider in detail the construction of a genus two Riemann surface by either sewing two punctured tori together or by sewing a twice-punctured torus to itself. In each case the genus two period matrix is explicitly described as a holomorphic map from a suitable domain (parameterized by genus one moduli and sewing parameters) to the Siegel upper half plane H2. Equivariance of these maps under certain subgroups of Sp(4,Z) is shown. The invertibility of both maps in a particular domain of H2 is also shown.

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