Packings and Steiner systems in polar spaces
From MaRDI portal
Publication:5886255
DOI10.5070/C63160424MaRDI QIDQ5886255
Kai-Uwe Schmidt, Unnamed Author
Publication date: 31 March 2023
Published in: Combinatorial Theory (Search for Journal in Brave)
Full work available at URL: https://arxiv.org/abs/2203.06709
Association schemes, strongly regular graphs (05E30) Spreads and packing problems in finite geometry (51E23) Connections of hypergeometric functions with groups and algebras, and related topics (33C80)
Cites Work
- Unnamed Item
- Unnamed Item
- Unnamed Item
- Unnamed Item
- On a new family of (P and Q)-polynomial schemes
- Association schemes and quadratic transformations for orthogonal polynomials
- A remark on partial linear spaces of girth 5 with an application to strongly regular graphs
- Designs and partial geometries over finite fields
- Ovoids and spreads of finite classical polar spaces
- Three addition theorems for some q-Krawtchouk polynomials
- Alternating bilinear forms over GF(q)
- Partitions and their stabilizers for line complexes and quadrics
- The collinearity graph of the \(O^-(8,2)\) quadric is not geometrisable
- The non-existence of ovoids in the dual polar space DW(5, \(q\))
- Hermitian rank distance codes
- On regular systems of finite classical polar spaces
- Algebraic combinatorics. Translated from the Japanese
- Quadratic and symmetric bilinear forms over finite fields and their association schemes
- Forme e geometrie hermitiane, con particolare riguardo al caso finito
- EXISTENCE OF -ANALOGS OF STEINER SYSTEMS
- Spreads, Translation Planes and Kerdock Sets. II
- General Galois Geometries
- Hypergeometric Orthogonal Polynomials and Their q-Analogues
- Some q-Krawtchouk Polynomials on Chevalley Groups
- Spreads, Translation Planes and Kerdock Sets. I
- Z4 -Kerdock Codes, Orthogonal Spreads, and Extremal Euclidean Line-Sets
- Finite Geometry and Combinatorial Applications
- Hahn Polynomials, Discrete Harmonics, andt-Designs
This page was built for publication: Packings and Steiner systems in polar spaces
