3,919 research outputs found

    Simple expressions for the long walk distance

    Full text link
    The walk distances in graphs are defined as the result of appropriate transformations of the βˆ‘k=0∞(tA)k\sum_{k=0}^\infty(tA)^k proximity measures, where AA is the weighted adjacency matrix of a connected weighted graph and tt is a sufficiently small positive parameter. The walk distances are graph-geodetic, moreover, they converge to the shortest path distance and to the so-called long walk distance as the parameter tt approaches its limiting values. In this paper, simple expressions for the long walk distance are obtained. They involve the generalized inverse, minors, and inverses of submatrices of the symmetric irreducible singular M-matrix L=ρIβˆ’A,{\cal L}=\rho I-A, where ρ\rho is the Perron root of A.A.Comment: 7 pages. Accepted for publication in Linear Algebra and Its Application
    • …
    corecore