English

On star-$k$-PCGs: Exploring class boundaries for small $k$ values

Combinatorics 2024-02-20 v2 Discrete Mathematics

Abstract

A graph G=(V,E)G=(V,E) is a star-kk-PCG if there exists a weight function w:VR+w: V \rightarrow R^+ and kk mutually exclusive intervals I1,I2,IkI_1, I_2, \ldots I_k, such that there is an edge uvEuv \in E if and only if w(u)+w(v)iIiw(u)+w(v) \in \bigcup_i I_i. These graphs are related to two important classes of graphs: PCGs and multithreshold graphs. It is known that for any graph GG there exists a kk such that GG is a star-kk-PCG. Thus, for a given graph GG it is interesting to know which is the minimum kk such that GG is a star-kk-PCG. We define this minimum kk as the star number of the graph, denoted by γ(G)\gamma(G). Here we investigate the star number of simple graph classes, such as graphs of small size, caterpillars, cycles and grids. Specifically, we determine the exact value of γ(G)\gamma(G) for all the graphs with at most 7 vertices. By doing so we show that the smallest graphs with star number 2 are only 4 and have exactly 5 vertices; the smallest graphs with star number 3 are only 3 and have exactly 7 vertices. Next, we provide a construction showing that the star number of caterpillars is one. Moreover, we show that the star number of cycles and two dimensional grid graphs is 2 and that the star number of 44-dimensional grids is at least 3. Finally, we conclude with numerous open problems.

Keywords

Cite

@article{arxiv.2209.11860,
  title  = {On star-$k$-PCGs: Exploring class boundaries for small $k$ values},
  author = {Angelo Monti and Blerina Sinaimeri},
  journal= {arXiv preprint arXiv:2209.11860},
  year   = {2024}
}
R2 v1 2026-06-28T02:00:00.609Z