论文信息 - Almost Well-Covered Graphs Without Short Cycles

Almost Well-Covered Graphs Without Short Cycles

We study graphs in which the maximum and the minimum sizes of a maximal independent set differ by exactly one. We call these graphs almost well-covered, in analogy with the class of well-covered graphs, in which all maximal independent sets have the same size. A characterization of graphs of girth at least $8$ having exactly two different sizes of maximal independent sets due to Finbow, Hartnell, and Whitehead implies a polynomial-time recognition algorithm for the class of almost well-covered graphs of girth at least $8$. We focus on the structure of almost well-covered graphs of girth at least $6$. We give a complete structural characterization of a subclass of the class of almost well-covered graphs of girth at least $6$, a polynomially testable characterization of another one, and a polynomial-time recognition algorithm of almost well-covered $\{C_3,C_4,C_5,C_7\}$-free graphs.

[1] Bert Hartnell,et al. A characterization of graphs of girth eight or more with exactly two sizes of maximal independent sets , 1994, Discret. Math..

[2] Douglas F. Rall,et al. On Graphs Having Maximal Independent Sets of Exactly t Distinct Cardinalities , 2013, Graphs Comb..

[3] M. Plummer. WELL-COVERED GRAPHS: A SURVEY , 1993 .

[4] Kathryn Fraughnaugh,et al. Introduction to graph theory , 1973, Mathematical Gazette.

[5] Dieter Rautenbach,et al. On graphs with maximal independent sets of few sizes, minimum degree at least 2, and girth at least 7 , 2013, Discret. Math..

[6] Richard J. Nowakowski,et al. A Characterization of Well Covered Graphs of Girth 5 or Greater , 1993, J. Comb. Theory, Ser. B.

[7] Martin Milanic,et al. On Three Extensions of Equimatchable Graphs , 2016, Electron. Notes Discret. Math..

[8] V. Chvátal,et al. A Note on Well-Covered Graphs , 1993 .

[9] Ramesh S. Sankaranarayana,et al. Complexity results for well-covered graphs , 1992, Networks.