Abstract. One of the standard basic steps in drawing hierarchical graphs is to invert some arcs of the given graph to make the graph acyclic. We discuss exact and parameterized algorithms for this problem. In particular we examine a graph class called (1, n)-graphs, which contains cubic graphs. We discuss exact and parameterized algorithms, where we use a non-standard measure approach for the analysis. Especially the analysis of the parameterized algorithm is of special interest, as it is not an amortized analysis modelled by ’finite states ’ but is rather a ’top-down ’ amortized analysis. For (1, n)-graphs we achieve a running time of O ∗ (1.1871 m) and O ∗ (1.212 k), for cubic graphs O ∗ (1.1798 m) and O ∗ (1.201 k), respectively. As a by...
Abstract. Given a graph G and an integer k, the FEEDBACK VERTEX SET (FVS) problem asks if there is a...
We describe a new algorithm for the efficient generation of all non-isomorphic connected cubic graph...
A graph is a cycle of cliques, if its set of vertices can be partitioned into clusters, such that ea...
One of the standard basic steps in drawing hierarchical graphs is to invert some arcs of the given g...
Abstract. Finding a maximum acyclic subgraph is on the list of prob-lems that seem to be hard to tac...
The Sugiyama framework is the most commonly used concept for visualizing directed graphs.It draws th...
A unit cube in k dimensions (k-cube) is defined as the Cartesian product R-1 x R-2 x ... x R-k where...
We consider the problem of deciding whether a given directed graph can be vertex partitioned into tw...
We study two measures of nonplanarity of cubic graphs G, the genus γ (G), and the edge deletion numb...
AbstractLet G be a non-trivial, loopless graph and for each non-trivial subgraph H of G, let g(H)=|E...
This paper provides the complete proof of the fact that any planar cubic graph is at most single-ben...
AbstractThis paper presents new algorithms for recognizing several classes of perfectly orderable gr...
It is known that problems like Vertex Cover, Feedback Vertex Set and Odd Cycle Transversal are polyn...
We present a fixed parameter algorithm that constructively solves the k-dominating set problem on g...
rected, loopless graph, we want to find a set of edge modifications (insertions and deletions) of mi...
Abstract. Given a graph G and an integer k, the FEEDBACK VERTEX SET (FVS) problem asks if there is a...
We describe a new algorithm for the efficient generation of all non-isomorphic connected cubic graph...
A graph is a cycle of cliques, if its set of vertices can be partitioned into clusters, such that ea...
One of the standard basic steps in drawing hierarchical graphs is to invert some arcs of the given g...
Abstract. Finding a maximum acyclic subgraph is on the list of prob-lems that seem to be hard to tac...
The Sugiyama framework is the most commonly used concept for visualizing directed graphs.It draws th...
A unit cube in k dimensions (k-cube) is defined as the Cartesian product R-1 x R-2 x ... x R-k where...
We consider the problem of deciding whether a given directed graph can be vertex partitioned into tw...
We study two measures of nonplanarity of cubic graphs G, the genus γ (G), and the edge deletion numb...
AbstractLet G be a non-trivial, loopless graph and for each non-trivial subgraph H of G, let g(H)=|E...
This paper provides the complete proof of the fact that any planar cubic graph is at most single-ben...
AbstractThis paper presents new algorithms for recognizing several classes of perfectly orderable gr...
It is known that problems like Vertex Cover, Feedback Vertex Set and Odd Cycle Transversal are polyn...
We present a fixed parameter algorithm that constructively solves the k-dominating set problem on g...
rected, loopless graph, we want to find a set of edge modifications (insertions and deletions) of mi...
Abstract. Given a graph G and an integer k, the FEEDBACK VERTEX SET (FVS) problem asks if there is a...
We describe a new algorithm for the efficient generation of all non-isomorphic connected cubic graph...
A graph is a cycle of cliques, if its set of vertices can be partitioned into clusters, such that ea...