Spanning tree congestion was defined by Ostrovskii (2004) as a measure of how well a network can perform if only minimal connection can be maintained. We compute the parameter for several families of graphs. In particular, by partitioning a hypercube into pieces with almost optimal edge-boundaries, we give tight estimates of the parameter thereby disproving a conjecture of Hruska (2008). For a typical random graph, the parameter exhibits a zigzag behaviour reflecting the feature that it is not monotone in the number of edges. This motivates the study of the most congested graphs where we show that any graph is close to a graph with small congestion. Next, we enumerate independent sets. Using the independent set polynomial, we compute the ex...
The semi-streaming model is a variant of the streaming model frequently used for the computation of ...
We show that for any $k$ there is a polynomial time algorithm to evaluate the weighted graph polynom...
AbstractWe study the approximability of some problems which aim at finding spanning trees in undirec...
AbstractThis paper investigates the problem of embedding a graph into a tree with the same vertex se...
Spanning tree congestion is a relatively new graph parameter, which has been studied intensively. Th...
We study the problem of determining the spanning tree congestion of a graph. We present some sharp c...
AbstractLet G be a finite connected graph and T be a spanning tree. For any edge e of T, let Ae,Be b...
AbstractLet G be a connected graph and T be a spanning tree of G. For e∈E(T), the congestion of e is...
We study the problem of determining the spanning tree congestion of a graph. We present some sharp c...
Let G be a connected graph and T be a spanning tree of G. For e ∈ E(T), the congestion of e is the n...
AbstractThe polynomial we consider here is the characteristic polynomial of a certain (not adjacency...
In the spanning tree congestion problem, given a connected graph $G$, the objective is to compute a ...
AbstractWe prove that every connected graph G of order n has a spanning tree T such that for every e...
Given a weighted graph G = (V;E), a positive integer k, and a penalty fun tion w p, we want to nd k ...
The bandwidth of a n-vertex graph G is the smallest integer b such that there exists a bijective fun...
The semi-streaming model is a variant of the streaming model frequently used for the computation of ...
We show that for any $k$ there is a polynomial time algorithm to evaluate the weighted graph polynom...
AbstractWe study the approximability of some problems which aim at finding spanning trees in undirec...
AbstractThis paper investigates the problem of embedding a graph into a tree with the same vertex se...
Spanning tree congestion is a relatively new graph parameter, which has been studied intensively. Th...
We study the problem of determining the spanning tree congestion of a graph. We present some sharp c...
AbstractLet G be a finite connected graph and T be a spanning tree. For any edge e of T, let Ae,Be b...
AbstractLet G be a connected graph and T be a spanning tree of G. For e∈E(T), the congestion of e is...
We study the problem of determining the spanning tree congestion of a graph. We present some sharp c...
Let G be a connected graph and T be a spanning tree of G. For e ∈ E(T), the congestion of e is the n...
AbstractThe polynomial we consider here is the characteristic polynomial of a certain (not adjacency...
In the spanning tree congestion problem, given a connected graph $G$, the objective is to compute a ...
AbstractWe prove that every connected graph G of order n has a spanning tree T such that for every e...
Given a weighted graph G = (V;E), a positive integer k, and a penalty fun tion w p, we want to nd k ...
The bandwidth of a n-vertex graph G is the smallest integer b such that there exists a bijective fun...
The semi-streaming model is a variant of the streaming model frequently used for the computation of ...
We show that for any $k$ there is a polynomial time algorithm to evaluate the weighted graph polynom...
AbstractWe study the approximability of some problems which aim at finding spanning trees in undirec...