scholarly journals The Chromatic Number of the $q$-Kneser Graph for Large $q$

10.37236/7907 ◽  
2019 ◽  
Vol 26 (1) ◽  
Author(s):  
Ferdinand Ihringer
Keyword(s):  
Chromatic Number ◽  
Type Result ◽  
Kneser Graph ◽  
Intersecting Families

We obtain a new weak Hilton-Milner type result for intersecting families of $k$-spaces in $\mathbb{F}_q^{2k}$, which improves several known results. In particular the chromatic number of the $q$-Kneser graph $qK_{n:k}$ was previously known for $n > 2k$ (except for $n=2k+1$ and $q=2$) or $k < q \log q - q$. Our result determines the chromatic number of $qK_{2k:k}$ for $q \geqslant 5$, so that the only remaining open cases are $(n, k) = (2k, k)$ with $q \in \{ 2, 3, 4 \}$ and $(n, k) = (2k+1, k)$ with $q = 2$.

On the chromatic number of a subgraph of the Kneser graph

2018 ◽  
Vol 68 ◽  
pp. 227-232 ◽  
Author(s):  
Bart Litjens ◽  
Sven Polak ◽  
Bart Sevenster ◽  
Lluís Vena
Keyword(s):  
Chromatic Number ◽  
Kneser Graph

scholarly journals Spectral Lower Bounds for the Quantum Chromatic Number of a Graph – Part II

10.37236/9295 ◽  
2020 ◽  
Vol 27 (4) ◽  
Author(s):  
Pawel Wocjan ◽  
Clive Elphick ◽  
Parisa Darbari
Keyword(s):  
Chromatic Number ◽  
Lower Bounds ◽  
Kneser Graph

Hoffman proved that a graph $G$ with eigenvalues $\mu_1 \geqslant \cdots \geqslant \mu_n$ and chromatic number $\chi(G)$ satisfies: \[\chi \geqslant 1 + \kappa\] where $\kappa$ is the smallest integer such that \[\mu_1 + \sum_{i=1}^{\kappa} \mu_{n+1-i} \leqslant 0.\] We strengthen this well known result by proving that $\chi(G)$ can be replaced by the quantum chromatic number, $\chi_q(G)$, where for all graphs $\chi_q(G) \leqslant \chi(G)$ and for some graphs $\chi_q(G)$ is significantly smaller than $\chi(G)$. We also prove a similar result, and investigate implications of these inequalities for the quantum chromatic number of various classes of graphs, which improves many known results. For example, we demonstrate that the Kneser graph $KG_{p,2}$ has $\chi_q = \chi = p - 2$.

scholarly journals Colorful Subhypergraphs in Kneser Hypergraphs

10.37236/3573 ◽  
2014 ◽  
Vol 21 (1) ◽  
Author(s):  
Frédéric Meunier
Keyword(s):  
Lower Bound ◽  
Chromatic Number ◽  
Bipartite Graphs ◽  
Uniform Hypergraph ◽  
Proper Coloring ◽  
Kneser Graph ◽  
Complete Bipartite Graphs ◽  
Definition Of ◽  
Ky Fan

Using a $\mathbb{Z}_q$-generalization of a theorem of Ky Fan, we extend to Kneser hypergraphs a theorem of Simonyi and Tardos that ensures the existence of multicolored complete bipartite graphs in any proper coloring of a Kneser graph. It allows to derive a lower bound for the local chromatic number of Kneser hypergraphs (using a natural definition of what can be the local chromatic number of a uniform hypergraph).

A note on the chromatic number of the square of Kneser graph K(2k+1,k)

2020 ◽  
Vol 343 (1) ◽  
pp. 111630
Author(s):  
Jeong-Hyun Kang ◽  
Hemanshu Kaul
Keyword(s):  
Chromatic Number ◽  
Kneser Graph

scholarly journals Idealness of k-wise intersecting families

2020 ◽  
Author(s):  
Ahmad Abdi ◽  
Gérard Cornuéjols ◽  
Tony Huynh ◽  
Dabeen Lee
Keyword(s):  
Chromatic Number ◽  
Common Element ◽  
Binary Matroids ◽  
Projective Geometries ◽  
Intersecting Families ◽  
Cycle Covers ◽  
Binary Clutters

Abstract A clutter is k-wise intersecting if every k members have a common element, yet no element belongs to all members. We conjecture that, for some integer $$k\ge 4$$ k ≥ 4 , every k-wise intersecting clutter is non-ideal. As evidence for our conjecture, we prove it for $$k=4$$ k = 4 for the class of binary clutters. Two key ingredients for our proof are Jaeger’s 8-flow theorem for graphs, and Seymour’s characterization of the binary matroids with the sums of circuits property. As further evidence for our conjecture, we also note that it follows from an unpublished conjecture of Seymour from 1975. We also discuss connections to the chromatic number of a clutter, projective geometries over the two-element field, uniform cycle covers in graphs, and quarter-integral packings of value two in ideal clutters.

scholarly journals Applications of a New Separator Theorem for String Graphs

2013 ◽  
Vol 23 (1) ◽  
pp. 66-74 ◽  
Author(s):  
JACOB FOX ◽  
JÁNOS PACH
Keyword(s):  
Bipartite Graph ◽  
Chromatic Number ◽  
Present Note ◽  
Intersection Graph ◽  
Type Result ◽  
Vertex Separator ◽  
String Graphs ◽  
String Graph ◽  
Ramsey Type ◽  
Separator Theorem

An intersection graph of curves in the plane is called astring graph. Matoušek almost completely settled a conjecture of the authors by showing that every string graph withmedges admits a vertex separator of size$O(\sqrt{m}\log m)$. In the present note, this bound is combined with a result of the authors, according to which every dense string graph contains a large complete balanced bipartite graph. Three applications are given concerning string graphsGwithnvertices: (i) ifKt⊈Gfor somet, then the chromatic number ofGis at most (logn)O(logt); (ii) ifKt,t⊈G, thenGhas at mostt(logt)O(1)nedges,; and (iii) a lopsided Ramsey-type result, which shows that the Erdős–Hajnal conjecture almost holds for string graphs.

scholarly journals Vertex Covering with Monochromatic Pieces of few Colours

10.37236/7469 ◽  
2018 ◽  
Vol 25 (3) ◽  
Author(s):  
Marlo Eugster ◽  
Frank Mousset
Keyword(s):  
Chromatic Number ◽  
Complete Graph ◽  
Independence Number ◽  
Vertex Cover ◽  
Constant Factor ◽  
Regular Graphs ◽  
Kneser Graph ◽  
Vertex Covering ◽  
Vertex Graph ◽  
Positive Integers

In 1995, Erdös and Gyárfás proved that in every $2$-colouring of the edges of $K_n$, there is a vertex cover by $2\sqrt{n}$ monochromatic paths of the same colour, which is optimal up to a constant factor. The main goal of this paper is to study the natural multi-colour generalization of this problem: given two positive integers $r,s$, what is the smallest number $pc_{r,s}(K_n)$ such that in every colouring of the edges of $K_n$ with $r$ colours, there exists a vertex cover of $K_n$ by $pc_{r,s}(K_n)$ monochromatic paths using altogether at most $s$ different colours?For fixed integers $r>s$ and as $n\to\infty$, we prove that $pc_{r,s}(K_n) = \Theta(n^{1/\chi})$, where $\chi=\max{\{1,2+2s-r\}}$ is the chromatic number of the Kneser graph $KG(r,r-s)$. More generally, if one replaces $K_n$ by an arbitrary $n$-vertex graph with fixed independence number $\alpha$, then we have $pc_{r,s}(G) = O(n^{1/\chi})$, where this time around $\chi$ is the chromatic number of the Kneser hypergraph $KG^{(\alpha+1)}(r,r-s)$. This result is tight in the sense that there exist graphs with independence number $\alpha$ for which $pc_{r,s}(G) = \Omega(n^{1/\chi})$. This is in sharp contrast to the case $r=s$, where it follows from a result of Sárközy (2012) that $pc_{r,r}(G)$ depends only on $r$ and $\alpha$, but not on the number of vertices.We obtain similar results for the situation where instead of using paths, one wants to cover a graph with bounded independence number by monochromatic cycles, or a complete graph by monochromatic $d$-regular graphs.

scholarly journals The equivariant topology of stable Kneser graphs

2011 ◽  
Vol DMTCS Proceedings vol. AO,... (Proceedings) ◽  
Author(s):  
Carsten Schultz
Keyword(s):  
Chromatic Number ◽  
Dihedral Group ◽  
Cohomology Ring ◽  
The Other ◽  
Kneser Graph ◽  
Critical Graph ◽  
Equivariant Topology ◽  
Test Graph ◽  
International Audience ◽  
Kneser Graphs

International audience Schrijver introduced the stable Kneser graph $SG_{n,k}, n \geq 1, k \geq 0$. This graph is a vertex critical graph with chromatic number $k+2$, its vertices are certain subsets of a set of cardinality $m=2n+k$. Björner and de Longueville have shown that its box complex is homotopy equivalent to a sphere, $\mathrm{Hom}(K_2,SG_{n,k}) \simeq \mathbb{S}^k$. The dihedral group $D_{2m}$ acts canonically on $SG_{n,k}$. We study the $D_{2m}$ action on $\mathrm{Hom}(K_2,SG_{n,k})$ and define a corresponding orthogonal action on $\mathbb{R}^{k+1} \supset \mathbb{S}^k$. We establish a close equivariant relationship between the graphs $SG_{n,k}$ and Borsuk graphs of the $k$-sphere and use this together with calculations in the $\mathbb{Z}_2$-cohomology ring of $D_{2m}$ to tell which stable Kneser graphs are test graphs in the sense of Babson and Kozlov. The graphs $SG_{2s,4}$ are test graphs, i.e. for every graph $H$ and $r \geq 0$ such that $\mathrm{Hom}(SG_{2s,4},H)$ is $(r-1)$-connected, the chromatic number $\chi (H)$ is at least $r+6$. On the other hand, if $k \notin \{0,1,2,4,8\}$ and $n \geq N(k)$ then $SG_{n,k}$ is not a homotopy test graph, i.e. there are a graph $G$ and an $r \geq 1$ such that $\mathrm{Hom}(SG_{n,k}, G)$ is $(r-1)$-connected and $\chi (G) < r+k+2$. The latter result also depends on a new necessary criterion for being a test graph, which involves the automorphism group of the graph. Schrijver a défini le graphe de Kneser stable $SG_{n,k}$, avec $n \geq 1$ et $k \geq 0$. Le graphe $SG_{n,k}$ est un graphe critique (par rapport aux sommets) de nombre chromatique $k+2$, dont les sommets correspondent à certains sous-ensembles d'un ensemble de cardinalité $m=2n+k$. Björner et de Longueville ont démontré que son complexe de boîtes et la sphère sont homotopiquement équivalents, c'est-à-dire $\mathrm{Hom}(K_2,SG_{n,k}) \simeq \mathbb{S}^k$. Le groupe diédral $D_{2m}$ agit sur $SG_{n,k}$ canoniquement. Nous étudions l'action de $D_{2m}$ sur $\mathrm{Hom}(K_2,SG_{n,k})$ et nous définissons une action orthogonale correspondante sur $\mathbb{R}^{k+1} \supset \mathbb{S}^k$. Par ailleurs, nous fournissons une relation équivariante étroite entre les graphes $SG_{n,k}$ et les graphes de Borsuk de la sphère de dimension $k$. Utilisant cette relation et certains calculs dans l'anneau de cohomologie de $D_{2m}$ sur $\mathbb{Z}_2$, nous décrivons quels graphes de Kneser stables sont des graphes de tests selon la notion de Babson et Kozlov. Les graphes $SG_{2s,4}$ sont des graphes de tests, c'est-à-dire que pour tout $H$ et $r \geq 0$ tels que $\mathrm{Hom}(SG_{2s,4},H)$ est $(r-1)$-connexe, le nombre chromatique $\chi (H)$ est au moins $r+6$. D'autre part, si $k \notin \{0,1,2,4,8\}$ et $n \geq N(k)$, alors $SG_{n,k}$ n'est pas un graphe de tests d'homologie: il existe un graphe $G$ et un entier $r \geq 1$ tels que $\mathrm{Hom}(SG_{n,k}, G)$ est $(r-1)$-connexe et $\chi (G) < r+k+2$. Ce dernier résultat dépend d'un nouveau critère nécessaire pour être un graphe de tests, qui implique le groupe d'automorphismes du graphe.

scholarly journals The Distinguishing Chromatic Number of Kneser Graphs

10.37236/3066 ◽  
2013 ◽  
Vol 20 (1) ◽  
Author(s):  
Zhongyuan Che ◽  
Karen L. Collins
Keyword(s):  
Abelian Group ◽  
Automorphism Group ◽  
Chromatic Number ◽  
Finite Abelian Group ◽  
Proper Coloring ◽  
Kneser Graph ◽  
Nontrivial Automorphism ◽  
Vertex Set ◽  
Kneser Graphs ◽  
Element Set

A labeling $f: V(G) \rightarrow \{1, 2, \ldots, d\}$ of the vertex set of a graph $G$ is said to be proper $d$-distinguishing if it is a proper coloring of $G$ and any nontrivial automorphism of $G$ maps at least one vertex to a vertex with a different label. The distinguishing chromatic number of $G$, denoted by $\chi_D(G)$, is the minimum $d$ such that $G$ has a proper $d$-distinguishing labeling. Let $\chi(G)$ be the chromatic number of $G$ and $D(G)$ be the distinguishing number of $G$. Clearly, $\chi_D(G) \ge \chi(G)$ and $\chi_D(G) \ge D(G)$. Collins, Hovey and Trenk have given a tight upper bound on $\chi_D(G)-\chi(G)$ in terms of the order of the automorphism group of $G$, improved when the automorphism group of $G$ is a finite abelian group. The Kneser graph $K(n,r)$ is a graph whose vertices are the $r$-subsets of an $n$ element set, and two vertices of $K(n,r)$ are adjacent if their corresponding two $r$-subsets are disjoint. In this paper, we provide a class of graphs $G$, namely Kneser graphs $K(n,r)$, whose automorphism group is the symmetric group, $S_n$, such that $\chi_D(G) - \chi(G) \le 1$. In particular, we prove that $\chi_D(K(n,2))=\chi(K(n,2))+1$ for $n\ge 5$. In addition, we show that $\chi_D(K(n,r))=\chi(K(n,r))$ for $n \ge 2r+1$ and $r\ge 3$.

scholarly journals On the Chromatic Number of Matching Kneser Graphs

2019 ◽  
Vol 29 (1) ◽  
pp. 1-21
Author(s):  
Meysam Alishahi ◽  
Hajiabolhassan Hossein
Keyword(s):  
Lower Bound ◽  
Chromatic Number ◽  
Large Family ◽  
Permutation Graphs ◽  
Kneser Graph ◽  
Ulam Theorem ◽  
Turán Number ◽  
Vertex Set ◽  
Kneser Graphs ◽  
Host Graph

AbstractIn an earlier paper, the present authors (2015) introduced the altermatic number of graphs and used Tucker’s lemma, an equivalent combinatorial version of the Borsuk–Ulam theorem, to prove that the altermatic number is a lower bound for chromatic number. A matching Kneser graph is a graph whose vertex set consists of all matchings of a specified size in a host graph and two vertices are adjacent if their corresponding matchings are edge-disjoint. Some well-known families of graphs such as Kneser graphs, Schrijver graphs and permutation graphs can be represented by matching Kneser graphs. In this paper, unifying and generalizing some earlier works by Lovász (1978) and Schrijver (1978), we determine the chromatic number of a large family of matching Kneser graphs by specifying their altermatic number. In particular, we determine the chromatic number of these matching Kneser graphs in terms of the generalized Turán number of matchings.

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