A linear forest is a union of vertex-disjoint paths, and the linear arboricity of a graph $G$, denoted by $\operatorname{la}(G)$, is the minimum number of linear forests needed to partition the edge set of $G$. Clearly, $\operatorname{la}(G) \ge \lceil\Delta(G)/2\rceil$ for a graph $G$ with maximum degree $\Delta(G)$. On the other hand, the Linear Arboricity Conjecture due to Akiyama, Exoo, and Harary from 1981 asserts that $\operatorname{la}(G) \leq \lceil(\Delta(G)+1) / 2\rceil$ for every graph $ G $. This conjecture has been verified for planar graphs and graphs whose maximum degree is at most $ 6 $, or is equal to $ 8 $ or $ 10 $. Given a positive integer $k$, a graph $G$ is $k$-degenerate if it can be reduced to a trivial graph by su...
AbstractBermond et al. [2] conjectured that the edge set of a cubic graph G can be partitioned into ...
AbstractA linear k-forest is a forest whose components are paths of length at most k. The linear k-a...
Abstract. Let G be a planar graph with maximum degree ∆. The linear 2-arboricity la2(G) of G is the ...
The linear arboricity la(G) of a graph G is the minimum number of linear forests that partition the ...
AbstractThe linear arboricity of a graph G is the minimum number of linear forests which partition t...
In 1980, Akiyama, Exoo and Harary posited the Linear Arboricity Conjecture which states that any gra...
AbstractA linear k-forest of an undirected graph G is a subgraph of G whose components are paths wit...
AbstractLet us call a linear-k-forest a graph whose connected components are chains of length at mos...
The linear arboricity la(G) of a graph G is the minimum number of linear forests which partition the...
AbstractWe present here a conjecture on partitioning the edges of a graph into k-linear forests (for...
The linear arboricity la(G) of a graph G is the minimum number of linear forests which partition the...
A linear forest is a graph in which each connected component is a chordless path. A linear partition...
AbstractA linear k-forest of a undirected graph G is a subgraph of G whose components are paths with...
AbstractThe k-linear arboricity of a graph G is the minimum number of forests whose connected compon...
A graph $G$ is $d$-degenerate if every non-null subgraph of $G$ has a vertex of degree at most $d$. ...
AbstractBermond et al. [2] conjectured that the edge set of a cubic graph G can be partitioned into ...
AbstractA linear k-forest is a forest whose components are paths of length at most k. The linear k-a...
Abstract. Let G be a planar graph with maximum degree ∆. The linear 2-arboricity la2(G) of G is the ...
The linear arboricity la(G) of a graph G is the minimum number of linear forests that partition the ...
AbstractThe linear arboricity of a graph G is the minimum number of linear forests which partition t...
In 1980, Akiyama, Exoo and Harary posited the Linear Arboricity Conjecture which states that any gra...
AbstractA linear k-forest of an undirected graph G is a subgraph of G whose components are paths wit...
AbstractLet us call a linear-k-forest a graph whose connected components are chains of length at mos...
The linear arboricity la(G) of a graph G is the minimum number of linear forests which partition the...
AbstractWe present here a conjecture on partitioning the edges of a graph into k-linear forests (for...
The linear arboricity la(G) of a graph G is the minimum number of linear forests which partition the...
A linear forest is a graph in which each connected component is a chordless path. A linear partition...
AbstractA linear k-forest of a undirected graph G is a subgraph of G whose components are paths with...
AbstractThe k-linear arboricity of a graph G is the minimum number of forests whose connected compon...
A graph $G$ is $d$-degenerate if every non-null subgraph of $G$ has a vertex of degree at most $d$. ...
AbstractBermond et al. [2] conjectured that the edge set of a cubic graph G can be partitioned into ...
AbstractA linear k-forest is a forest whose components are paths of length at most k. The linear k-a...
Abstract. Let G be a planar graph with maximum degree ∆. The linear 2-arboricity la2(G) of G is the ...