AbstractA family P of simple (that is, cycle-free) paths is a path decomposition of a tournament T if and only if P partitions the acrs of T. The path number of T, denoted pn(T), is the minimum value of |P| over all path decompositions P of T. In this paper it is shown that if n is even, then there is a tournament on n vertices with path number k if and only if n2 ≦ k ≦ n24, k an integer. It is also shown that if n is odd and T is a tournament on n vertices, then (n + 1)2 ≦ pn(T) ≦ (n2 − 1)4. Moreover, if k is an integer satisfying (i) (n + 1)2 ≦ k ≦ n − 1 or (ii) n < k ≦ (n2 − 1)4 and k is even, then a tournament on n vertices having path number k is constructed. It is conjectured that there are no tournaments of odd order n with odd path ...
The study of problems concerning subdivisions of graphs has a rich history in extremal combinatorics...
Let V be a n-set (set of size n). Let E be the collection of all possible k-subsets (subsets of size...
AbstractA digraph T is strong if for every pair of vertices u and v there exists a directed path fro...
AbstractA path decomposition of a digraph D is a partition of its edge set into edge disjoint simple...
In this work we consider a generalisation of Kelly's conjecture which is due Alspach, Mason, and Pul...
AbstractA king in a tournament is a vertex which can reach every other vertex via a 1-path or 2-path...
We prove that every \(n\)-vertex tournament has at most \(n \left(\frac{n-1}{2} \right)^k\) walks of...
AbstractA tournament is an orientation of a complete graph, and in general a multipartite or c-parti...
In 1976, Alspach, Mason, and Pullman conjectured that any tournament $T$ of even order can be decomp...
AbstractThe Ramsey number r(D1,…,Dk) of acyclic directed graphs D1,…,Dk is defined as the largest in...
The domination graph of a digraph has the same vertices as the digraph with an edge between two vert...
This thesis mainly deals with the existence of directed cycles and directed paths (or short: cycles ...
AbstractLet T be a strong tournament of order n≥4 with given minimum out-degree δ+ and in-degree δ−....
AbstractLet T = (V, A) be a tournament with p vertices. T is called completely strong path-connected...
We prove that if a tournament has pathwidth >= 4 theta(2) + 7 theta then it has theta vertices that ...
The study of problems concerning subdivisions of graphs has a rich history in extremal combinatorics...
Let V be a n-set (set of size n). Let E be the collection of all possible k-subsets (subsets of size...
AbstractA digraph T is strong if for every pair of vertices u and v there exists a directed path fro...
AbstractA path decomposition of a digraph D is a partition of its edge set into edge disjoint simple...
In this work we consider a generalisation of Kelly's conjecture which is due Alspach, Mason, and Pul...
AbstractA king in a tournament is a vertex which can reach every other vertex via a 1-path or 2-path...
We prove that every \(n\)-vertex tournament has at most \(n \left(\frac{n-1}{2} \right)^k\) walks of...
AbstractA tournament is an orientation of a complete graph, and in general a multipartite or c-parti...
In 1976, Alspach, Mason, and Pullman conjectured that any tournament $T$ of even order can be decomp...
AbstractThe Ramsey number r(D1,…,Dk) of acyclic directed graphs D1,…,Dk is defined as the largest in...
The domination graph of a digraph has the same vertices as the digraph with an edge between two vert...
This thesis mainly deals with the existence of directed cycles and directed paths (or short: cycles ...
AbstractLet T be a strong tournament of order n≥4 with given minimum out-degree δ+ and in-degree δ−....
AbstractLet T = (V, A) be a tournament with p vertices. T is called completely strong path-connected...
We prove that if a tournament has pathwidth >= 4 theta(2) + 7 theta then it has theta vertices that ...
The study of problems concerning subdivisions of graphs has a rich history in extremal combinatorics...
Let V be a n-set (set of size n). Let E be the collection of all possible k-subsets (subsets of size...
AbstractA digraph T is strong if for every pair of vertices u and v there exists a directed path fro...