English

Multi-cyclic graphs in the random graph process with restricted budget

Combinatorics 2025-02-26 v2

Abstract

We study a controlled random graph process introduced by Frieze, Krivelevich, and Michaeli. In this model, the edges of a complete graph are randomly ordered and revealed sequentially to a builder. For each edge revealed, the builder must irrevocably decide whether to purchase it. The process is subject to two constraints: the number of observed edges tt and the builder's budget bb. The goal of the builder is to construct, with high probability, a graph possessing a desired property. Previously, the optimal dependencies of the budget bb on nn and tt were established for constructing a graph containing a fixed tree or cycle, and the authors claimed that their proof could be extended to any unicyclic graph. The problem, however, remained open for graphs containing at least two cycles, the smallest of which is the graph K4K_4^- (a clique of size four with one edge removed). In this paper, we provide a strategy to construct a copy of the graph K4K_4^- if bmax{n6/t4,n4/3/t2/3}b \gg \max\left\{n^6 / t^4, n^{4 / 3} / t^{2 / 3}\right\}, and show that this bound is tight, answering the question posed by Frieze et al. concerning this specific graph. We also give a strategy to construct a copy of a graph consisting of kk triangles intersecting at a single vertex (the kk-fan) if bmax{n4k1/t3k1,n/t}b \gg \max\left\{n^{4k - 1} / t^{3k - 1}, n / \sqrt{t}\right\}, and also show that this bound is tight. These are the first optimal strategies for constructing a multi-cyclic graph in this random graph model.

Keywords

Cite

@article{arxiv.2412.17620,
  title  = {Multi-cyclic graphs in the random graph process with restricted budget},
  author = {Daniel Iľkovič and Jared León and Xichao Shu},
  journal= {arXiv preprint arXiv:2412.17620},
  year   = {2025}
}

Comments

16 pages, 2 figures

R2 v1 2026-06-28T20:46:45.440Z