Central Configurations and Mutual Differences

Abstract

Central configurations are solutions of the equations λ mjqj = ∂ U∂ qj, where U denotes the potential function and each qj is a point in the d-dimensional Euclidean space E Rd, for j=1,…, n. We show that the vector of the mutual differences qij = qi - qj satisfies the equation -λα q = Pm((q)), where Pm is the orthogonal projection over the spaces of 1-cocycles and (q) = q|q|α+2. It is shown that differences qij of central configurations are critical points of an analogue of U, defined on the space of 1-cochains in the Euclidean space E, and restricted to the subspace of 1-cocycles. Some generalizations of well known facts follow almost immediately from this approach.