English

A note on short cycles in a hypercube

Combinatorics 2016-05-25 v2

Abstract

How many edges can a quadrilateral-free subgraph of a hypercube have? This question was raised by Paul Erd\H{o}s about 2727 years ago. His conjecture that such a subgraph asymptotically has at most half the edges of a hypercube is still unresolved. Let f(n,Cl)f(n,C_l) be the largest number of edges in a subgraph of a hypercube QnQ_n containing no cycle of length ll. It is known that f(n,Cl)=o(E(Qn))f(n, C_l) = o(|E(Q_n)|), when l=4kl= 4k, k2k\geq 2 and that f(n,C6)13E(Qn)f(n, C_6) \geq \frac{1}{3} |E(Q_n)|. It is an open question to determine f(n,Cl)f(n, C_l) for l=4k+2l=4k+2, k2k\geq 2. Here, we give a general upper bound for f(n,Cl)f(n,C_l) when l=4k+2l=4k+2 and provide a coloring of E(Qn)E(Q_n) by 44 colors containing no induced monochromatic C10C_{10}.

Keywords

Cite

@article{arxiv.1605.06572,
  title  = {A note on short cycles in a hypercube},
  author = {Maria Axenovich and Ryan R. Martin},
  journal= {arXiv preprint arXiv:1605.06572},
  year   = {2016}
}

Comments

9 pages

R2 v1 2026-06-22T14:06:09.756Z