On (Sub)stochastic and Transient Weightings of Infinite Strong Digraphs
Abstract
In the present paper, for a given (possibly, infinite) strongly connected digraph D, we consider the class S<( D) of all truthly substochastic weightings of D (here, the word "truthly" means that there exists a vertex whose out-weight is strictly less than 1). For a finite subdigraph F of D weighted by S∈ S<( D), let max(F) be the length of its longest directed cycle and λS(F) be the Perron root (spectral radius) of its weighted adjacency matrix. We prove that the infimum of max(F)(1-λS(F)) taken over all F is positive for every S∈ S<( D) if and only if D admits a finite cycle transversal. The result obtained provides general theorems on the set T( D) of transient weightings of D. In particular, we present a theorem of alternatives for finite approximations to elements of T( D) and simply reprove V. Cyr's criterion for T( D) to be empty.
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