It is known that a closed polygon P is a critical point of the oriented area function if and only if P is a cyclic polygon, that is, P can be inscribed in a circle. Moreover, there is a short formula for the Morse index. Going further in this direction, we extend these results to the case of open polygonal chains, or robot arms. We introduce the notion of the oriented area for an open polygonal chain, prove that critical points are exactly the cyclic configurations with antipodal endpoints and derive a formula for the Morse index of a critical configuratio
For most classes of chains, it is known if these contain locks, but especially for fixed-angle equil...
Given a 3D polygonal chain with fixed edge lengths and fixed angles between consecutive edges (short...
Given a simple generalized polygon A of line segments and arcs that is free to move and rotate and a...
It is known that a closed polygon P is a critical point of the oriented area function if and only if...
It is known that a closed polygon P is a critical point of the oriented area function if and only if...
Consider a mechanical linkages whose underlying graph is a polygon with a diagonal constraint, or mo...
We consider the configuration space of planar n-gons with fixed perimeter, which is diffeomorphic to...
A polygonal linkage can be imagined as a set of n rigid bars connected by links cyclically. This co...
We determine all critical confiurations for the Area function on polygons with vertices on a circle ...
In this paper we study the area function of polygons, where the vertices are sliding along curves. W...
We study perimeters of connecting cycles for concentric circles. More precisely, we are interested i...
In this paper we study the area function of polygons, where the vertices are sliding along curves. W...
We consider the oriented area function A on the moduli space M(P) of mechanical linkage P representi...
For any polygonal array, independently of the number of sides on each polygon the zig-zag polygonal ...
We investigate the critical points of Coulomb potential of point charges placed at the vertices of a...
For most classes of chains, it is known if these contain locks, but especially for fixed-angle equil...
Given a 3D polygonal chain with fixed edge lengths and fixed angles between consecutive edges (short...
Given a simple generalized polygon A of line segments and arcs that is free to move and rotate and a...
It is known that a closed polygon P is a critical point of the oriented area function if and only if...
It is known that a closed polygon P is a critical point of the oriented area function if and only if...
Consider a mechanical linkages whose underlying graph is a polygon with a diagonal constraint, or mo...
We consider the configuration space of planar n-gons with fixed perimeter, which is diffeomorphic to...
A polygonal linkage can be imagined as a set of n rigid bars connected by links cyclically. This co...
We determine all critical confiurations for the Area function on polygons with vertices on a circle ...
In this paper we study the area function of polygons, where the vertices are sliding along curves. W...
We study perimeters of connecting cycles for concentric circles. More precisely, we are interested i...
In this paper we study the area function of polygons, where the vertices are sliding along curves. W...
We consider the oriented area function A on the moduli space M(P) of mechanical linkage P representi...
For any polygonal array, independently of the number of sides on each polygon the zig-zag polygonal ...
We investigate the critical points of Coulomb potential of point charges placed at the vertices of a...
For most classes of chains, it is known if these contain locks, but especially for fixed-angle equil...
Given a 3D polygonal chain with fixed edge lengths and fixed angles between consecutive edges (short...
Given a simple generalized polygon A of line segments and arcs that is free to move and rotate and a...