Reliability Polynomials and their Asymptotic Limits for Families of Graphs

Abstract

We present exact calculations of reliability polynomials R(G,p) for lattice strips G of fixed widths Ly 4 and arbitrarily great length Lx with various boundary conditions. We introduce the notion of a reliability per vertex, r(\G\,p) = |V| ∞ R(G,p)1/|V| where |V| denotes the number of vertices in G and \G\ denotes the formal limit |V| ∞ G. We calculate this exactly for various families of graphs. We also study the zeros of R(G,p) in the complex p plane and determine exactly the asymptotic accumulation set of these zeros B, across which r(\G\) is nonanalytic.

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