Add to ORKGA {\it $K_l$ -expansion} consists of $l$ vertex-disjoint trees, every two of which are joined by an edge. We call such an expansion {\it odd} if its vertices can be two-coloured so that the edges of the trees are bichromatic but the edges between trees are monochromatic. We show that, for every $l$, if a graph contains no odd $K_l$ -expansion then its chromatic number is $O(l \sqrt{\log l})$. In doing so, we obtain a characterization of graphs which contain no odd $K_l$ -expansion which is of independent interest. We also prove that given a graph and a subset $S$ of its vertex set, either there are $k$ vertex-disjoint odd paths with endpoints in $S$, or there is a set X of at most $2k − 2$ vertices such that every odd path with both ends in...
Hadwiger\u27s conjecture from 1943 states that for every integer t≥1, every graph either can be t-co...
Hadwiger's conjecture states that for every graph G, chi(G) <= eta(G), where chi(G) is the chromatic...
Given a graph $G$, a vertex-colouring $σ$ of $G$, and a subset $X\subseteq V(G)$, a colour $x \in σ(...
A Kl-expansion consists of l vertex-disjoint trees, every two of which are joined by an edge. We cal...
AbstractA Kl-expansion consists of l vertex-disjoint trees, every two of which are joined by an edge...
We say that H has an odd complete minor of order at least l if there are l vertex disjoint trees in ...
AbstractGerards and Seymour (see [T.R. Jensen, B. Toft, Graph Coloring Problems, Wiley-Interscience,...
Hadwiger's conjecture asserts that any graph contains a clique minor with order no less than the chr...
Given a graph G, the Hadwiger number of G, denoted by h(G), is the largest integer κ such that G con...
We prove two structural decomposition theorems about graphs ex-cluding a fixed odd minor H, and show...
We study the existence of expander graphs with a focus on odd and unique expanders. The main goal is...
A linear forest is a graph whose connected components are chordless paths. A linear partition of a g...
The odd edge-connectivity between two vertices in a graph is the maximum number λ_o(u,v) of edge-dis...
AbstractWe give a short proof that every graph G without an odd Kk-minor is O(klogk)-colorable. This...
In 1943, Hadwiger conjectured that every graph with no $K_t$ minor is $(t-1)$-colorable for every $t...
Hadwiger\u27s conjecture from 1943 states that for every integer t≥1, every graph either can be t-co...
Hadwiger's conjecture states that for every graph G, chi(G) <= eta(G), where chi(G) is the chromatic...
Given a graph $G$, a vertex-colouring $σ$ of $G$, and a subset $X\subseteq V(G)$, a colour $x \in σ(...
A Kl-expansion consists of l vertex-disjoint trees, every two of which are joined by an edge. We cal...
AbstractA Kl-expansion consists of l vertex-disjoint trees, every two of which are joined by an edge...
We say that H has an odd complete minor of order at least l if there are l vertex disjoint trees in ...
AbstractGerards and Seymour (see [T.R. Jensen, B. Toft, Graph Coloring Problems, Wiley-Interscience,...
Hadwiger's conjecture asserts that any graph contains a clique minor with order no less than the chr...
Given a graph G, the Hadwiger number of G, denoted by h(G), is the largest integer κ such that G con...
We prove two structural decomposition theorems about graphs ex-cluding a fixed odd minor H, and show...
We study the existence of expander graphs with a focus on odd and unique expanders. The main goal is...
A linear forest is a graph whose connected components are chordless paths. A linear partition of a g...
The odd edge-connectivity between two vertices in a graph is the maximum number λ_o(u,v) of edge-dis...
AbstractWe give a short proof that every graph G without an odd Kk-minor is O(klogk)-colorable. This...
In 1943, Hadwiger conjectured that every graph with no $K_t$ minor is $(t-1)$-colorable for every $t...
Hadwiger\u27s conjecture from 1943 states that for every integer t≥1, every graph either can be t-co...
Hadwiger's conjecture states that for every graph G, chi(G) <= eta(G), where chi(G) is the chromatic...
Given a graph $G$, a vertex-colouring $σ$ of $G$, and a subset $X\subseteq V(G)$, a colour $x \in σ(...