English

New lower bounds for partial $k$-parallelisms

Combinatorics 2019-10-22 v1

Abstract

Due to the applications in network coding, subspace codes and designs have received many attentions. Suppose that knk\mid n and V(n,q)V(n,q) is an nn-dimensional space over the finite field Fq\mathbb{F}_{q}. A kk-spread is a qn1qk1\frac{q^n-1}{q^k-1}-set of kk-dimensional subspaces of V(n,q)V(n,q) such that each nonzero vector is covered exactly once. A partial kk-parallelism in V(n,q)V(n,q) is a set of pairwise disjoint kk-spreads. As the number of kk-dimensional subspaces in V(n,q)V(n,q) is [nk]q{n \brack k}_{q}, there are at most [n1k1]q{n-1 \brack k-1}_{q} spreads in a partial kk-parallelism. By studying the independence numbers of Cayley graphs associated to a special type of partial kk-parallelisms in V(n,q)V(n,q), we obtain new lower bounds for partial kk-parallelisms. In particular, we show that there exist at least qk1qn1[n1k1]q\frac{q^{k}-1}{q^{n}-1}{n-1 \brack k-1}_q pairwise disjoint kk-spreads in V(n,q)V(n,q).

Keywords

Cite

@article{arxiv.1910.09178,
  title  = {New lower bounds for partial $k$-parallelisms},
  author = {Tao Zhang and Yue Zhou},
  journal= {arXiv preprint arXiv:1910.09178},
  year   = {2019}
}

Comments

To appear in Journal of Combinatorial Designs

R2 v1 2026-06-23T11:49:28.847Z