In 2009, Röglin and Teng showed that the smoothed number of Pareto optimal solutions of linear multi-criteria optimization problems is polynomially bounded in the number n of variables and the maximum density φ of the semi-random input model for any fixed number of objective functions. Their bound is, however, not very practical because the exponents grow exponentially in the number d + 1 of objective functions. In a recent breakthrough, Moitra and O’Donnell improved this bound significantly to O n2dφd(d+1)/2 An “intriguing problem”, which Moitra and O’Donnell formulate in their paper, is how much further this bound can be improved. The previous lower bounds do not exclude the possibility of a polynomial upper bound whose degree does not d...
Many real-world applications of multi-objective optimization involve a large number of objectives. A...
A very simple example of an algorithmic problem solvable by dynamic programming is to maximize, over...
Multiple objective optimization involves the simultaneous optimization of more than one, possibly co...
Abstract: Smoothed analysis of multiobjective 0–1 linear optimization has drawn con-siderable attent...
<p><b>.</b> In particular, 611 solutions are efficient of order 14 (i.e., these are indeed the solut...
We consider bicriteria optimization problems and investigate the relationship between two standard a...
A well-known example of global optimization that provides solutions within fixed error limits is opt...
AbstractWe consider bicriteria optimization problems and investigate the relationship between two st...
International audienceThis work proposes an upper bound on the maximal number of non-dominated point...
AbstractWe consider combinatorial optimization problems with a feasible solution set S⊆{0,1}n specif...
The set of available multi-objective optimization algorithms continues to grow. This fact can be pa...
We consider semidefinite programs (SDPs) of size n with equality constraints. In order to overcome s...
In the paper we investigate the possibility of finding the Pareto set in combinatorial multicriteria...
Many real-world applications of multi-objective optimization involve a large number of objectives. A...
We present a probabilistic analysis of a large class of combinatorial optimization problems containi...
Many real-world applications of multi-objective optimization involve a large number of objectives. A...
A very simple example of an algorithmic problem solvable by dynamic programming is to maximize, over...
Multiple objective optimization involves the simultaneous optimization of more than one, possibly co...
Abstract: Smoothed analysis of multiobjective 0–1 linear optimization has drawn con-siderable attent...
<p><b>.</b> In particular, 611 solutions are efficient of order 14 (i.e., these are indeed the solut...
We consider bicriteria optimization problems and investigate the relationship between two standard a...
A well-known example of global optimization that provides solutions within fixed error limits is opt...
AbstractWe consider bicriteria optimization problems and investigate the relationship between two st...
International audienceThis work proposes an upper bound on the maximal number of non-dominated point...
AbstractWe consider combinatorial optimization problems with a feasible solution set S⊆{0,1}n specif...
The set of available multi-objective optimization algorithms continues to grow. This fact can be pa...
We consider semidefinite programs (SDPs) of size n with equality constraints. In order to overcome s...
In the paper we investigate the possibility of finding the Pareto set in combinatorial multicriteria...
Many real-world applications of multi-objective optimization involve a large number of objectives. A...
We present a probabilistic analysis of a large class of combinatorial optimization problems containi...
Many real-world applications of multi-objective optimization involve a large number of objectives. A...
A very simple example of an algorithmic problem solvable by dynamic programming is to maximize, over...
Multiple objective optimization involves the simultaneous optimization of more than one, possibly co...