Green's functions for Sturm-Liouville problems on directed tree graphs

Abstract

Let be geometric tree graph with m edges and consider the second order Sturm-Liouville operator [u]=(-pu')'+qu acting on functions that are continuous on all of , and twice continuously differentiable in the interior of each edge. The functions p and q are assumed uniformly continuous on each edge, and p strictly positive on . The problem is to find a solution f: to the problem [f] = h with 2m additional conditions at the nodes of . These node conditions include continuity at internal nodes, and jump conditions on the derivatives of f with respect to a positive measure . Node conditions are given in the form of linear functionals 1,...,2m acting on the space of admissible functions. A novel formula is given for the Green's function G:× associated to this problem. Namely, the solution to the semi-homogenous problem [f] = h, i[f] =0 for i=1,...,2m is given by f(x) = ∫ G(x,y) h(y) .