Straume, Eldar On the geometry and behavior of \(n\)-body motions. (English) Zbl 1014.70013 Int. J. Math. Math. Sci. 28, No. 12, 689-732 (2001). Summary: The kinematic separation of size, shape, and orientation of \(n\)-body systems is investigated together with specific issues concerning the dynamics of classical \(n\)-body motions. A central topic is the asymptotic behavior of general collisions, extending the early work of Siegel, Wintner, and more recently Saari. In particular, we give asymptotic formulas for the derivatives of any order of basic kinematic quantities. The kinematic Riemannian metric on the congruence and shape moduli spaces are introduced via \(O(3)\)-equivariant geometry. For \(n = 3\), a classical geometrization procedure is carried out explicitly for planar three-body motions, reducing them to solutions of a rather simple system of geodesic equations in three-dimensional congruence space. The paper is largely expository, and various known results on classical \(n\)-body motions are surveyed in our more geometrical setting. Cited in 4 Documents MSC: 70F10 \(n\)-body problems 70G45 Differential geometric methods (tensors, connections, symplectic, Poisson, contact, Riemannian, nonholonomic, etc.) for problems in mechanics 70F16 Collisions in celestial mechanics, regularization Keywords:asymptotic behavior of collisions; kinematic Riemannian metric; shape moduli spaces; \(O(3)\)-equivariant geometry; geometrization procedure; geodesic equations; three-dimensional congruence space; \(n\)-body motions PDFBibTeX XMLCite \textit{E. Straume}, Int. J. Math. Math. Sci. 28, No. 12, 689--732 (2001; Zbl 1014.70013) Full Text: DOI EuDML Link