Article dans revue scientifique avec comité de lecture.International audienceThis paper studies movements of polygonal chains in three dimensions whose links are not allowed to cross or change length. Our main result is an algorithmic proof that any simple closed chain that initially takes the form of a planar polygon can be made convex in three dimensions. Other results include an algorithm for straightening open chains having a simple orthogonal projection onto some plane, and an algorithm for making convex any open chain initially configured on the surface of a polytope. All our algorithms require only O(n) basic ``moves.'
We extend linkage unfolding results from the well-studied case of polygonal linkages to the more gen...
[[abstract]]We consider the problem of unfolding lattice trees and polygons in hexagonal or triangul...
We study the motion of polygonal linkages under the restriction that the angles between adjacent edg...
In this paper, we study movements of simple polygonal chains in 3D. We say that an open, simple poly...
In this paper we are concerned with motions for untangling polygonal linkages (chains, polygons and ...
AbstractWe prove that, in all dimensions d⩾4, every simple open polygonal chain and every tree may b...
We prove that, in all dimensions d ≥ 4, every simple open polygonal chain and every tree may be stra...
The resolution of a decades-old open problem is described: polygonal chains cannot lock in the plane
For most classes of chains, it is known if these contain locks, but especially for fixed-angle equil...
[[abstract]]We consider the problems of straightening polygonal trees and convexifying polygons by c...
We consider the problems of straightening polygonal trees and convexifying polygons by continuous mo...
If we attach to each bar in a polygonal chain a rigid shape whose inward normals all hit the attache...
This thesis contains new results on the subject of polygonal structure reconfiguration. Specificall...
Fixed-angle polygonal chains in three dimensions serve as an interesting model of protein backbones....
We consider the problem of unfolding lattice trees and polygons in hexagonal or triangular lattice i...
We extend linkage unfolding results from the well-studied case of polygonal linkages to the more gen...
[[abstract]]We consider the problem of unfolding lattice trees and polygons in hexagonal or triangul...
We study the motion of polygonal linkages under the restriction that the angles between adjacent edg...
In this paper, we study movements of simple polygonal chains in 3D. We say that an open, simple poly...
In this paper we are concerned with motions for untangling polygonal linkages (chains, polygons and ...
AbstractWe prove that, in all dimensions d⩾4, every simple open polygonal chain and every tree may b...
We prove that, in all dimensions d ≥ 4, every simple open polygonal chain and every tree may be stra...
The resolution of a decades-old open problem is described: polygonal chains cannot lock in the plane
For most classes of chains, it is known if these contain locks, but especially for fixed-angle equil...
[[abstract]]We consider the problems of straightening polygonal trees and convexifying polygons by c...
We consider the problems of straightening polygonal trees and convexifying polygons by continuous mo...
If we attach to each bar in a polygonal chain a rigid shape whose inward normals all hit the attache...
This thesis contains new results on the subject of polygonal structure reconfiguration. Specificall...
Fixed-angle polygonal chains in three dimensions serve as an interesting model of protein backbones....
We consider the problem of unfolding lattice trees and polygons in hexagonal or triangular lattice i...
We extend linkage unfolding results from the well-studied case of polygonal linkages to the more gen...
[[abstract]]We consider the problem of unfolding lattice trees and polygons in hexagonal or triangul...
We study the motion of polygonal linkages under the restriction that the angles between adjacent edg...