Sigma Functions for Telescopic Curves

Abstract

In this paper, we consider the sigma functions for algebraic curves expressed by a canonical form using a finite sequence (a1,...,at) of positive integers whose greatest common divisor is equal to one (Miura [13]). The idea is to express a non-singular algebraic curve by affine equations of t variables whose orders at infinity are (a1,...,at). We construct a symplectic basis of the first cohomology group and the sigma functions for telescopic curves, i.e., the curves such that the number of defining equations is exactly t-1 in the Miura canonical form. The largest class of curves for which such construction has been obtained thus far is (n,s)-curves ([3][15]), which are telescopic because they are expressed in the Miura canonical form with t=2, a1=n, and a2=s, and the number of defining equations is one.