English

Potentially $K_{m}-G$-graphical Sequences: A Survey

Combinatorics 2009-11-15 v3

Abstract

The set of all non-increasing nonnegative integers sequence π=\pi= (d(v1),d(v_1), d(v2),d(v_2), ...,..., d(vn)d(v_n)) is denoted by NSnNS_n. A sequence πNSn\pi\in NS_n is said to be graphic if it is the degree sequence of a simple graph GG on nn vertices, and such a graph GG is called a realization of π\pi. The set of all graphic sequences in NSnNS_n is denoted by GSnGS_n. A graphical sequence π\pi is potentially HH-graphical if there is a realization of π\pi containing HH as a subgraph, while π\pi is forcibly HH-graphical if every realization of π\pi contains HH as a subgraph. Let KkK_k denote a complete graph on kk vertices. Let KmHK_{m}-H be the graph obtained from KmK_{m} by removing the edges set E(H)E(H) of the graph HH (HH is a subgraph of KmK_{m}). This paper summarizes briefly some recent results on potentially KmGK_{m}-G-graphic sequences and give a useful classification for determining σ(H,n)\sigma(H,n).

Keywords

Cite

@article{arxiv.0804.4226,
  title  = {Potentially $K_{m}-G$-graphical Sequences: A Survey},
  author = {Chunhui Lai and Lili Hu},
  journal= {arXiv preprint arXiv:0804.4226},
  year   = {2009}
}

Comments

18 pages

R2 v1 2026-06-21T10:34:51.478Z