English

Fast construction on a restricted budget

Combinatorics 2024-11-26 v4

Abstract

We introduce a model of a controlled random graph process. In this model, the edges of the complete graph KnK_n are ordered randomly and then revealed, one by one, to a player called Builder. He must decide, immediately and irrevocably, whether to purchase each observed edge. The observation time is bounded by parameter tt, and the total budget of purchased edges is bounded by parameter bb. Builder's goal is to devise a strategy that, with high probability, allows him to construct a graph of purchased edges possessing a target graph property P\mathcal{P}, all within the limitations of observation time and total budget. We show the following: (a) Builder has a strategy to achieve kk-vertex-connectivity at the hitting time for this property by purchasing at most cknc_kn edges for an explicit ck<kc_k<k; and a strategy to achieve minimum degree kk (slightly) after the threshold for minimum degree kk by purchasing at most (1+ε)kn/2(1+\varepsilon)kn/2 edges (which is optimal). (b) Builder has a strategy to create a Hamilton cycle at the hitting time for Hamiltonicity by purchasing at most CnCn edges for an absolute constant C>1C>1; this is optimal in the sense that CC cannot be arbitrarily close to 11. This substantially extends the classical hitting time result for Hamiltonicity due to Ajtai--Koml\'os--Szemer\'edi and Bollob\'as. (c) Builder has a strategy to create a perfect matching by time (1+ε)nlogn/2(1+\varepsilon)n\log{n}/2 while purchasing at most (1+ε)n/2(1+\varepsilon)n/2 edges (which is optimal). (d) Builder has a strategy to create a copy of a given kk-vertex tree if tbmax{(n/t)k2,1}t\ge b\gg\max\{(n/t)^{k-2},1\}, and this is optimal; (e) For =2k+1\ell=2k+1 or =2k+2\ell=2k+2, Builder has a strategy to create a copy of a cycle of length \ell if bmax{nk+2/tk+1,n/t}b\gg\max \{n^{k+2}/t^{k+1},n/\sqrt{t}\}, and this is optimal.

Keywords

Cite

@article{arxiv.2207.07251,
  title  = {Fast construction on a restricted budget},
  author = {Alan Frieze and Michael Krivelevich and Peleg Michaeli},
  journal= {arXiv preprint arXiv:2207.07251},
  year   = {2024}
}

Comments

31 pages, 3 figures; minor changes and corrections

R2 v1 2026-06-25T00:55:59.272Z