Difference of solutions for the inversion problem of ultra-elliptic integrals

Abstract

Let V be a hyperelliptic curve of genus 2 defined by Y2=f(X), where f(X) is a polynomial of degree 5. The sigma function associated with V is a holomorphic function on C2. For a point P on V, we consider the problem to express the X-coordinate of P in terms of the image of P under the Abel-Jacobi map. Two meromorphic functions f2 and g2 on C2 which give solutions of this problem are known. Since f2 and g2 coincide on the zero set of the sigma function, it is expected that f2-g2 can be divided by the sigma function. In this paper, we decompose f2-g2 into a product of the sigma function and a meromorphic function explicitly.