AbstractWe consider the problem of approximating an integer program by first solving its relaxation linear program and then “rounding” the resulting solution. For several packing problems, we prove probabilistically that there exists an integer solution close to the optimum of the relaxation solution. We then develop a methodology for converting such a probabilistic existence proof to a deterministic approximation algorithm. The algorithm mimics the existence proof in a very strong sense
Various applications in reliability and risk management give rise to optimization problems with cons...
Abstract. The combinatorial problem of satisfying a given set of constraints that depend on N discre...
Integer programming formulations play a key role in the design of efficient algorithms and approxima...
AbstractWe consider the problem of approximating an integer program by first solving its relaxation ...
Several important NP-hard combinatorial optimization problems can be posed as packing/covering integ...
Several important NP-hard combinatorial optimization problems can be posed as packing/covering integ...
We present efficient new randomized and deterministic methods for transforming optimal solutions for...
We give new approximation algorithms for packing integer programs (PIPs) by employing the method of ...
AbstractWe introduce a subclass of NP optimization problems which contains some NP-hard problems, e....
Szele and others, that deterministic statements can be proved by probabilistic reasoning, led alread...
We consider stochastic programming problems with probabilistic constraints involving random variable...
In the first article we present a network based algorithm for probabilistic inference in an undirect...
In this paper we introduce a new general framework for set covering problems, based on the combinati...
We present a technique for converting RNC algorithms into NC algorithms. Our approach is based on a ...
In this paper we introduce a new general framework for set covering problems, based on the combinati...
Various applications in reliability and risk management give rise to optimization problems with cons...
Abstract. The combinatorial problem of satisfying a given set of constraints that depend on N discre...
Integer programming formulations play a key role in the design of efficient algorithms and approxima...
AbstractWe consider the problem of approximating an integer program by first solving its relaxation ...
Several important NP-hard combinatorial optimization problems can be posed as packing/covering integ...
Several important NP-hard combinatorial optimization problems can be posed as packing/covering integ...
We present efficient new randomized and deterministic methods for transforming optimal solutions for...
We give new approximation algorithms for packing integer programs (PIPs) by employing the method of ...
AbstractWe introduce a subclass of NP optimization problems which contains some NP-hard problems, e....
Szele and others, that deterministic statements can be proved by probabilistic reasoning, led alread...
We consider stochastic programming problems with probabilistic constraints involving random variable...
In the first article we present a network based algorithm for probabilistic inference in an undirect...
In this paper we introduce a new general framework for set covering problems, based on the combinati...
We present a technique for converting RNC algorithms into NC algorithms. Our approach is based on a ...
In this paper we introduce a new general framework for set covering problems, based on the combinati...
Various applications in reliability and risk management give rise to optimization problems with cons...
Abstract. The combinatorial problem of satisfying a given set of constraints that depend on N discre...
Integer programming formulations play a key role in the design of efficient algorithms and approxima...