On Radial Distribution and Quasi-exact Solvability of Brioschi-Halphen Equation

Abstract

The Brioschi-Halphen equation (BHE) is a second order complex differential equation obtained by a two step transformation of the Lamé equation. The Lamé equation is an equation in Astronomical physics used in the study of motion of planetary bodies. In this paper, the radial part of the BHE for sufficiently large r and the argument limit 2π is obtained. The asymptotic radial wave function associated with BHE is obtained in terms of canonical polynomials Pn+1, and spherical function in L2(G, dμ), G=SL(2,R) using point canonical transformation and distributional solution in Cc∞(Ω) using Fourier transform method are obtained.