Hurwitz integrality of the power series expansion of the sigma function for a telescopic curve

Abstract

A telescopic curve is a certain algebraic curve defined by m-1 equations in the affine space of dimension m, which can be a hyperelliptic curve and an (n,s) curve as a special case. The sigma function σ(u) associated with the telescopic curve of genus g is a holomorphic function on Cg. For a subring R of C and variables u=t(u1,…, ug), let \[R u =\Σi1,…,ig0i1,…,igu1i1·s ugigi1!·s ig!\;|\;i1,…,ig∈ R\.\] If the power series expansion of a holomorphic function f(u) on Cg around the origin belongs to R u , then f(u) is said to be Hurwitz integral over R. In this paper, we show that the sigma function σ(u) associated with the telescopic curve is Hurwitz integral over the ring generated by the coefficients of the defining equations of the curve and 12 over Z. Further, we show that σ(u)2 is Hurwitz integral over the ring generated by the coefficients of the defining equations of the curve over Z. Our results are a generalization of the results of Y. \Onishi for (n,s) curves to telescopic curves.