Irregular independence and irregular domination

Abstract: If A is an independent set of a graph G such that the vertices in A have different degrees, then we call A an irregular independent set of G. If D is a dominating set of G such that the vertices that are not in D have different numbers of neighbours in D, then we call D an irregular dominating set of G. The size of a largest irregular independent set of G and the size of a smallest irregular dominating set of G are denoted by α ir (G) and γ ir (G), respectively. We initiate the investigation of these two graph… Show more

“…Starting from here, Albertson [2] proved 1 that for n ≥ 6 in every 2-coloring of the edges of K n there is a monochromatic K 3 with two equal degrees. Inspired by this result several papers were written, see for example [3,5,6,8,11].…”

“…Further related notions are the so-called fair dominating sets (which actually are regular dominating sets, see Caro, Hansberg and Henning [10]), irregular independence number and irregular domination number (Borg, Caro and Fenech [8]), and the problem of monochromatic degree-monotone paths in 2-colorings of the edges of complete graphs (Caro,Yuster and Zarb [12]).…”

Singular Ramsey and Turán numbers

“…Starting from here, Albertson [2] proved 1 that for n ≥ 6 in every 2-coloring of the edges of K n there is a monochromatic K 3 with two equal degrees. Inspired by this result several papers were written, see for example [3,5,6,8,11].…”

“…Further related notions are the so-called fair dominating sets (which actually are regular dominating sets, see Caro, Hansberg and Henning [10]), irregular independence number and irregular domination number (Borg, Caro and Fenech [8]), and the problem of monochromatic degree-monotone paths in 2-colorings of the edges of complete graphs (Caro,Yuster and Zarb [12]).…”

Singular Ramsey and Turán numbers