Token-sliding realizability for complements, Cartesian-products, and grid graph families

Abstract

For an integer k 0 and a graph G, the token-sliding reconfiguration graph TSk(G) has the independent k-sets of G as vertices. Two vertices are adjacent if one token can slide along an edge of G and the resulting k-set is still independent. We study the following realizability problem: for fixed k 2, which graphs are isomorphic to TSk(G) for some graph G? This inverse viewpoint asks which abstract state spaces can occur exactly under a local token rule. We give positive realizability results for the complement targets Kn, Km,n, and Kn-e, and we determine sharp cutoffs for complements of paths and cycles. We also prove a product formula for token-sliding graphs of disjoint unions and apply it to Cartesian products of complete graphs, paths, and cycles. For every grid Γm,n=Pm Pn with 2 m n, we realize Γm,n at token value m+n-2 and at every token value k 4. At small token values, we prove that C4 Cn is not a TS2-graph for n 4, classify ladders Γ2,n, and settle the first non-ladder grid: for k 2, Γ3,3 is realizable if and only if k 4.