Geometric aspects of self-adjoint Sturm-Liouville problems

Abstract

In the paper, we use U(2), the group of 2× 2 unitary matices, to parameterize the space of all self-adjoint boundary conditions for a fixed Sturm-Liouville equation on the interval [0,1]. The adjoint action of U(2) on itself naturally leads to a refined classification of self-adjoint boundary conditions--each adjoint orbit is a subclass of these boundary conditions. We give explicit parameterizations of those adjoint orbits of principal type, i.e. orbits diffeomorphic to the 2-sphere S2, and investigate the behavior of the n-th eigenvalue λn as a function on such orbits.