English

Packing Designs with large block size

Combinatorics 2025-07-18 v2

Abstract

Given positive integers vv, kk, tt and λ\lambda with vktv \geq k \geq t, a packing design PDλ(v,k,t)_{\lambda}(v,k,t) is a pair (V,B)(V,\mathcal{B}), where VV is a vv-set and B\mathcal{B} is a collection of kk-subsets of VV such that each tt-subset of VV appears in at most λ\lambda elements of B\mathcal{B}. When λ=1\lambda=1, a PD1(v,k,t)_1(v,k,t) is equivalent to a binary code with length vv, minimum distance 2(kt+1)2(k-t+1) and constant weight kk. The maximum size of a PDλ(v,k,t)_{\lambda}(v,k,t) is called the {packing number}, denoted PDNλ(v,k,t)_{\lambda}(v,k,t). In this paper we consider packing designs with kk large relative to vv. We prove that for a positive integer nn, PDNλ(v,k,t)=n_{\lambda}(v,k,t) = n whenever nk(t1)(nλ+1)λv<(n+1)k(t1)(n+1λ+1)nk-(t-1)\binom{n}{\lambda+1} \leq \lambda v < (n+1)k-(t-1)\binom{n+1}{\lambda+1}. We also prove that if no point appears in more than three blocks, then the blocks of a PD2(v,k,2)_2(v,k,2) can be ordered so that no ordered pair occurs more than once. This produces a directed packing design and we show that the corresponding directed packing number is equal to nn when nk(n3)2v<(n+1)k(n+13)nk-\binom{n}{3} \leq 2v < (n+1)k-\binom{n+1}{3}. Such directed packing designs yield (kt)(k-t)-insertion/deletion codes.

Cite

@article{arxiv.2410.22607,
  title  = {Packing Designs with large block size},
  author = {Andrea C. Burgess and Peter Danziger and Daniel Horsley and Muhammad Tariq Javed},
  journal= {arXiv preprint arXiv:2410.22607},
  year   = {2025}
}

Comments

25 pages

R2 v1 2026-06-28T19:40:30.879Z