We study a probabilistic optimization model for graph-problems under vertex-uncertainty. We assume that any vertex vi of the input-graph G(V,E) has only a probability pi to be present in the final graph to be optimized (i.e., the final instance for the problem tackled will be only a sub-graph of the initial graph). Under this model, the original "deterministic" problem gives rise to a new (deterministic) problem on the same input-graph G, having the same set of feasible solutions as the former one, but its objective function can be very different from the original one, the set of its optimal solutions too. Moreover, this objective function is a sum of 2|V| terms; hence, its computation is not immediately polynomial. We give sufficient condi...
In this paper we develop probabilistic arguments for justifying the quality of an approximate soluti...
A simple combinatorial approach is given for handling certain conditioning problems that arise in th...
We study a probabilistic optimization model for MIN SPANNING TREE, where any vertex vi of the input-...
We study a probabilistic optimization model for graph-problems under vertex-uncertainty. We assume t...
We study a probabilistic optimization model for graph-problems under vertex-uncertainty. We assume t...
AbstractWe first propose a formal definition for the concept of probabilistic combinatorial optimiza...
We first propose a formal definition for the concept of probabilistic combinatorial optimization pro...
This paper presents algorithms for five NP-hard problems: the vertex set cover of an undirected grap...
We revisit in this paper the stochastic model for minimum graph-coloring introduced in (Murat and Pa...
Extremal combinatorics can be described as a subfield of combinatorics that studies the maximum or m...
Data in several applications can be represented as an uncertain graph whose edges are labeled with a...
Many discrete optimization problems amount to select a feasible subgraph of least weight. We conside...
We study several problems in probabilistic and extremal combinatorics. Probabilistic combinatorics i...
AbstractIn combinatorial optimization problems that exhibit phase transition it is a frequently obse...
The field of combinatorial optimization under uncertainty has received increasing attention within t...
In this paper we develop probabilistic arguments for justifying the quality of an approximate soluti...
A simple combinatorial approach is given for handling certain conditioning problems that arise in th...
We study a probabilistic optimization model for MIN SPANNING TREE, where any vertex vi of the input-...
We study a probabilistic optimization model for graph-problems under vertex-uncertainty. We assume t...
We study a probabilistic optimization model for graph-problems under vertex-uncertainty. We assume t...
AbstractWe first propose a formal definition for the concept of probabilistic combinatorial optimiza...
We first propose a formal definition for the concept of probabilistic combinatorial optimization pro...
This paper presents algorithms for five NP-hard problems: the vertex set cover of an undirected grap...
We revisit in this paper the stochastic model for minimum graph-coloring introduced in (Murat and Pa...
Extremal combinatorics can be described as a subfield of combinatorics that studies the maximum or m...
Data in several applications can be represented as an uncertain graph whose edges are labeled with a...
Many discrete optimization problems amount to select a feasible subgraph of least weight. We conside...
We study several problems in probabilistic and extremal combinatorics. Probabilistic combinatorics i...
AbstractIn combinatorial optimization problems that exhibit phase transition it is a frequently obse...
The field of combinatorial optimization under uncertainty has received increasing attention within t...
In this paper we develop probabilistic arguments for justifying the quality of an approximate soluti...
A simple combinatorial approach is given for handling certain conditioning problems that arise in th...
We study a probabilistic optimization model for MIN SPANNING TREE, where any vertex vi of the input-...