Adjoint and Self-adjoint Differential Operators on Graphs
1998en
ABI
Abstract
A differential operator on a directed graph with weighted edges is characterized as a system of ordinary differential operators. A class of local operators is introduced to clarify which operators should be considered as defined on the graph. When the edge lengths have a positive lower bound, all local self-adjoint extensions of the minimal symmetric operator may be classified by boundary conditions at the vertices.
Citations and references
Cited by 20 references