A balanced configuration of points on the sphere $S^2$ is a (finite) set of points which are in equilibrium if they act on each other according any force law dependent only on the distance between two points. The configuration is additionally group-balanced if for each point in a configuration $\mathcal{C}$, there is a symmetry of $\mathcal{C}$ fixing only that point and its antipode. Leech showed that these definitions are equivalent on the sphere $S^2$ by classifying all possible balanced configurations. On the other hand, Cohn, Elkies, Kumar, and Sch\"urmann showed that for $n\geq 7,$ there are examples of balanced configurations in $S^{n-1}$ which are not group balanced. They also suggested extending the notion of balanced configuration...
Abstract We consider the effect of symmetry on the rigidity of bar-joint frameworks, spherical fram...
Abstract Let S be a set of r red points and b = r + 2δ blue points in general position in the plane....
A toric hyperplane is the preimage of a point $x \in S^1$ of a continuous surjective group homomorph...
Abstract: A configuration of particles confined to a sphere is balanced if it is in equilibrium unde...
AbstractIt is illustrated by a few mathematical results (mainly from combinatorics and discrete geom...
We study equilibrium configurations of infinitely many identical particles on the real line or finit...
We answer two questions of Beardon and Minda which arose from their study of the conformal symmetrie...
We use linear programming techniques to find points of absolute minimum over the unit sphere $S^{d}$...
A graph $\Gamma$ is said to be distance-balanced if for any edge $uv$ of $\Gamma$, the number of ver...
Choose $N$ unoriented lines through the origin of ${\bf R}^{d+1}$. The sum of the angles between the...
We consider the effect of symmetry on the rigidity of bar-joint frameworks, spherical frameworks and...
We begin by revisiting a paper of Erd\H{o}s and Fishburn, which posed the following question: given ...
Inspired by a planar partitioning problem involving multiple improper chambers, this article investi...
AbstractLet G be a group acting on a finite set Ω. Then G acts on Ω×Ω by its entry-wise action and i...
Let $n$ be the order of a (quaternary) Hadamard matrix. It is shown that the existence of a projecti...
Abstract We consider the effect of symmetry on the rigidity of bar-joint frameworks, spherical fram...
Abstract Let S be a set of r red points and b = r + 2δ blue points in general position in the plane....
A toric hyperplane is the preimage of a point $x \in S^1$ of a continuous surjective group homomorph...
Abstract: A configuration of particles confined to a sphere is balanced if it is in equilibrium unde...
AbstractIt is illustrated by a few mathematical results (mainly from combinatorics and discrete geom...
We study equilibrium configurations of infinitely many identical particles on the real line or finit...
We answer two questions of Beardon and Minda which arose from their study of the conformal symmetrie...
We use linear programming techniques to find points of absolute minimum over the unit sphere $S^{d}$...
A graph $\Gamma$ is said to be distance-balanced if for any edge $uv$ of $\Gamma$, the number of ver...
Choose $N$ unoriented lines through the origin of ${\bf R}^{d+1}$. The sum of the angles between the...
We consider the effect of symmetry on the rigidity of bar-joint frameworks, spherical frameworks and...
We begin by revisiting a paper of Erd\H{o}s and Fishburn, which posed the following question: given ...
Inspired by a planar partitioning problem involving multiple improper chambers, this article investi...
AbstractLet G be a group acting on a finite set Ω. Then G acts on Ω×Ω by its entry-wise action and i...
Let $n$ be the order of a (quaternary) Hadamard matrix. It is shown that the existence of a projecti...
Abstract We consider the effect of symmetry on the rigidity of bar-joint frameworks, spherical fram...
Abstract Let S be a set of r red points and b = r + 2δ blue points in general position in the plane....
A toric hyperplane is the preimage of a point $x \in S^1$ of a continuous surjective group homomorph...
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