Maximal cocliques in the Kneser graph on point–plane flags inPG(4,q)

Author:

Blokhuis A.,Brouwer A.E.,Szőnyi T.

Funder

ERC

OTKA

Publisher

Elsevier BV

Subject

Discrete Mathematics and Combinatorics

Reference6 articles.

1. A Hilton–Milner theorem for vector spaces;Blokhuis;Electron. J. Combin.,2010

2. On the chromatic number of q-Kneser graphs;Blokhuis;Des. Codes Cryptogr.,2012

3. Cocliques in the Kneser graph on the point-hyperplane flags of a projective space;Blokhuis;Combinatorica,2013

4. The Erdős–Ko–Rado theorem for vector spaces;Frankl;J. Combin. Theory Ser. A,1986

5. Ç. Güven, Buildings and Kneser graphs, Ph.D. Thesis, Eindhoven University of Technology, 2012.

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1. Maximal cocliques and the chromatic number of the Kneser graph on chambers of PG(3,q) $(3,q)$;Journal of Combinatorial Designs;2024-04-15

2. The unique coclique extension property for apartments of buildings;Innovations in Incidence Geometry: Algebraic, Topological and Combinatorial;2023-09-13

3. An algebraic approach to Erdős-Ko-Rado sets of flags in spherical buildings;Journal of Combinatorial Theory, Series A;2022-11

4. On the chromatic number of two generalized Kneser graphs;European Journal of Combinatorics;2022-03

5. An EKR-theorem for finite buildings of type $$D_{\ell }$$ D ℓ;Journal of Algebraic Combinatorics;2017-08-24

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