Roots of Two-Terminal Reliability

Abstract

Assume that the vertices of a graph G are always operational, but the edges of G are operational independently with probability p ∈[0,1]. For fixed vertices s and t, the two-terminal reliability of G is the probability that the operational subgraph contains an (s,t)-path, while the all-terminal reliability of G is the probability that the operational subgraph contains a spanning tree. Both reliabilities are polynomials in p, and have very similar behaviour in many respects. However, unlike all-terminal reliability, little is known about the roots of two-reliability polynomials. In a variety of ways, we shall show that the nature and location of the roots of two-terminal reliability polynomials have significantly different properties than those held by roots of the all-terminal reliability.