The problem of packing ellipsoids of different sizes and shapes into an ellipsoidal container so as to minimize a measure of overlap between ellipsoids is considered. A bilevel optimization formulation is given, together with an algorithm for the general case and a simpler algorithm for the special case in which all ellipsoids are in fact spheres. Convergence results are proved and computational experience is described and illustrated. The motivating application-chromosome organization in the human cell nucleus-is discussed briefly, and some illustrative results are presented
The focus of study in this paper is the class of packing problems. More specifically, it deals with ...
This work analyses the algorithm of billiard modelling in finding the densest packing of geometrical...
Given a fixed set of identical or different-sized circular items, the problem we deal with consists ...
Abstract. The problem of packing ellipsoids of different sizes and shapes into an ellipsoidal contai...
The problem of packing ellipsoids in the three-dimensional space is considered in the present work. ...
International audienceThis paper deals with the problem of packing two-dimensional objects of quite ...
In this paper, continuous and differentiable nonlinear programming models and algo-rithms for packin...
Constraints are often represented as ellipsoids. One of the main advantages of such constrains is th...
The paper considers a packing optimization problem of different spheres and cuboids into a cuboid of...
International audienceA new constructive algorithm, called Advancing layer algorithm, for the genera...
The paper studies a layout problem of variable number of ellipses with variable sizes placed into an...
In this doctoral thesis, we study the problem of computing the ball of smallest radius enclosing a g...
Part 4: Optimization, TuningInternational audienceWe propose a algorithm to give a approximate solut...
International audienceA new constructive ellipse packing algorithm is presented. It allows to respec...
We study a first-order method to find the minimum cross-sectional area ellipsoidal cylinder containi...
The focus of study in this paper is the class of packing problems. More specifically, it deals with ...
This work analyses the algorithm of billiard modelling in finding the densest packing of geometrical...
Given a fixed set of identical or different-sized circular items, the problem we deal with consists ...
Abstract. The problem of packing ellipsoids of different sizes and shapes into an ellipsoidal contai...
The problem of packing ellipsoids in the three-dimensional space is considered in the present work. ...
International audienceThis paper deals with the problem of packing two-dimensional objects of quite ...
In this paper, continuous and differentiable nonlinear programming models and algo-rithms for packin...
Constraints are often represented as ellipsoids. One of the main advantages of such constrains is th...
The paper considers a packing optimization problem of different spheres and cuboids into a cuboid of...
International audienceA new constructive algorithm, called Advancing layer algorithm, for the genera...
The paper studies a layout problem of variable number of ellipses with variable sizes placed into an...
In this doctoral thesis, we study the problem of computing the ball of smallest radius enclosing a g...
Part 4: Optimization, TuningInternational audienceWe propose a algorithm to give a approximate solut...
International audienceA new constructive ellipse packing algorithm is presented. It allows to respec...
We study a first-order method to find the minimum cross-sectional area ellipsoidal cylinder containi...
The focus of study in this paper is the class of packing problems. More specifically, it deals with ...
This work analyses the algorithm of billiard modelling in finding the densest packing of geometrical...
Given a fixed set of identical or different-sized circular items, the problem we deal with consists ...