The Toll Walk Transit Function of a Graph: Axiomatic Characterizations and First-Order Non-definability

Abstract

A walk W=w1w2… wk, k≥ 2, is called a toll walk if w1≠ wk and w2 and wk-1 are the only neighbors of w1 and wk, respectively, on W in a graph G. A toll walk interval T(u,v), u,v∈ V(G), contains all the vertices that belong to a toll walk between u and v. The toll walk intervals yield a toll walk transit function T:V(G)× V(G)→ 2V(G). We represent several axioms that characterize the toll walk transit function among chordal graphs, trees, asteroidal triple-free graphs, Ptolemaic graphs, and distance hereditary graphs. We also show that the toll walk transit function can not be described in the language of first-order logic for an arbitrary graph.

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