On functions of Jacobi-Weierstrass (I) and equation of Painleve

Abstract

The paper is an essentially extended version of the work math.CA/0601371, supplemented with an application. We present new results in the theory of classical θ-functions of Jacobi and σ-functions of Weierstrass: ordinary differential equations and series expansions. We also give the extension of canonical θ-functions and consider an application to the sixth Painlev\'e equation (P6). Picard--Hitchin's general solution of P6 is represented explicitly in a form of logarithmic derivative of a corresponding τ-function (Painlev\'e's form).