AbstractA cut in a graph G is the set of all edges between some set of vertices S and its complement S̄=V(G)−S. A cut-cover of G is a collection of cuts whose union is E(G) and the total size of a cut-cover is the sum of the number of edges of the cuts in the cover. The cut-cover size of a graph G, denoted by cs(G), is the minimum total size of a cut-cover of G. We give general bounds on cs(G), find sharp bounds for classes of graphs such as 4-colorable graphs and random graphs. We also address algorithmic aspects and give sharp bounds for the sum of the cut-cover sizes of a graph and its complement. We close with a list of open problems
Cut problems on graphs are a well-known and intensively studied class of optimization problems. In ...
We study two variants of Maximum Cut, which we call Connected Maximum Cut and Maximum Minimal Cut, i...
Graphs are important mathematical structures that are used to model many real-life problems. They ca...
AbstractA cut in a graph G is the set of all edges between some set of vertices S and its complement...
A cut in a graph G is the set of all edges between some set of vertices S and its complement S = V ...
We start by familiarizing ourselves with edge covers. We review several\ud interesting results for c...
AbstractA cycle cover (cut cover) of a graph G is a collection of cycles (cuts) of G that covers eve...
Let $G = (V,w)$ be a weighted undirected graph with $m$ edges. The cut dimension of $G$ is the dime...
We prove that in an undirected graph there are at most O(n 2 ) cuts of size strictly less than 3=2...
AbstractA new proof for the problem of the cut number of the 4-cube is given. This proof is independ...
For a graph G, let f(G) denote the size of the maximum cut in G. The problem of estimating f(G) as a...
none3Given an undirected graph G with n nodes and m edges, we address the problem of finding a larg...
AbstractAlon, et al. (2003) [1] proved that every graph with a large cut has a bipartition in which ...
The max-cut problem and the associated cut polytope on complete graphs have been extensively studied...
AbstractThe maximum number of cutvertices in a connected graph of order n having minimum degree at l...
Cut problems on graphs are a well-known and intensively studied class of optimization problems. In ...
We study two variants of Maximum Cut, which we call Connected Maximum Cut and Maximum Minimal Cut, i...
Graphs are important mathematical structures that are used to model many real-life problems. They ca...
AbstractA cut in a graph G is the set of all edges between some set of vertices S and its complement...
A cut in a graph G is the set of all edges between some set of vertices S and its complement S = V ...
We start by familiarizing ourselves with edge covers. We review several\ud interesting results for c...
AbstractA cycle cover (cut cover) of a graph G is a collection of cycles (cuts) of G that covers eve...
Let $G = (V,w)$ be a weighted undirected graph with $m$ edges. The cut dimension of $G$ is the dime...
We prove that in an undirected graph there are at most O(n 2 ) cuts of size strictly less than 3=2...
AbstractA new proof for the problem of the cut number of the 4-cube is given. This proof is independ...
For a graph G, let f(G) denote the size of the maximum cut in G. The problem of estimating f(G) as a...
none3Given an undirected graph G with n nodes and m edges, we address the problem of finding a larg...
AbstractAlon, et al. (2003) [1] proved that every graph with a large cut has a bipartition in which ...
The max-cut problem and the associated cut polytope on complete graphs have been extensively studied...
AbstractThe maximum number of cutvertices in a connected graph of order n having minimum degree at l...
Cut problems on graphs are a well-known and intensively studied class of optimization problems. In ...
We study two variants of Maximum Cut, which we call Connected Maximum Cut and Maximum Minimal Cut, i...
Graphs are important mathematical structures that are used to model many real-life problems. They ca...