Open AccessSaturation spectrum of paths and stars
Author(s) -
Jill Faudree,
Ralph J. Faudree,
Ronald J. Gould,
Michael S. Jacobson,
Brent J. Thomas
Publication year - 2017
Publication title -
discussiones mathematicae graph theory
Language(s) - English
Resource type - Journals
SCImago Journal Rank - 0.476
H-Index - 19
eISSN - 2083-5892
pISSN - 1234-3099
DOI - 10.7151/dmgt.1954
Subject(s) - combinatorics , saturation (graph theory) , mathematics , stars , graph , discrete mathematics , physics , astrophysics
A graph G is H-saturated if H is not a subgraph of G but the addition of any edge from G̅ to G results in a copy of H. The minimum size of an H-saturated graph on n vertices is denoted sat(n,H), while the maximum size is the well studied extremal number, ex(n,H). The saturation spectrum for a graph H is the set of sizes of H saturated graphs between sat(n,H) and ex(n,H). In this paper we completely determine the saturation spectrum of stars and we show the saturation spectrum of paths is continuous from sat(n, Pk) to within a constant of ex(n, Pk) when n is sufficiently large
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