Sharp bounds between the saturation number and the harmonic index

Abstract

The saturation number μ*(G) of a graph G is the minimum cardinality of a maximal matching, and H(G) is its harmonic index. TxGraffiti conjectured in 2023 that μ*(G) H(G) for every nontrivial connected graph G, and Bıyıkoğlu refuted this by showing that the ratio μ*(G)/H(G) can be made arbitrarily large. Restricting to trees bounds the ratio sharply. Every nontrivial tree T satisfies μ*(T) < 32 H(T), with the constant 3/2 best possible. A complementary bound H(G) < 4μ*(G) holds for every graph with an edge, so on a nontrivial tree the saturation number is pinned to 14 H(T) < μ*(T) < 32 H(T), both constants best possible. The friendship graph F4 is a smallest counterexample to the conjecture, on nine vertices, and the smallest tree counterexample is the subdivided star on eleven vertices. For each positive integer m a family of graphs with m hubs has ratio approaching m+1, while the conjecture holds whenever all vertices have equal degree. Both invariants arise in applications, the harmonic index as a molecular descriptor and the saturation number as a measure of adsorption inefficiency, and the bounds estimate the latter, which is NP-hard to compute, by the former, which is computable in linear time.