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arxiv: 1111.0284 · v3 · pith:N4NAJGFOnew · submitted 2011-11-01 · 🧮 math.CO · cs.DM· cs.SI· math.MG

A topological interpretation of the walk distances

classification 🧮 math.CO cs.DMcs.SImath.MG
keywords interpretationwalkdistancesmatrixapproachcofactorsi-talogarithms
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The walk distances in graphs have no direct interpretation in terms of walk weights, since they are introduced via the \emph{logarithms} of walk weights. Only in the limiting cases where the logarithms vanish such representations follow straightforwardly. The interpretation proposed in this paper rests on the identity $\ln\det B=\tr\ln B$ applied to the cofactors of the matrix $I-tA,$ where $A$ is the weighted adjacency matrix of a weighted multigraph and $t$ is a sufficiently small positive parameter. In addition, this interpretation is based on the power series expansion of the logarithm of a matrix. Kasteleyn (1967) was probably the first to apply the foregoing approach to expanding the determinant of $I-A$. We show that using a certain linear transformation the same approach can be extended to the cofactors of $I-tA,$ which provides a topological interpretation of the walk distances.

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