Isotropy Groups and Kinematic Orbits for 1 and 2-d N-Body Problems

Abstract

Mitchell and Littlejohn showed that isotropy groups and orbits for N-body problems attain a sense of genericity for N = 5. The author recently showed that the arbitrary-d generalization of this 3-d result is that genericity in this sense occurs for N = d + 2. The author also showed that a second sense of genericity -- now order-theoretic rather than a matter of counting -- occurs for N = 2 d + 1, excepting d = 3, for which it is not 7 but 8. Applications of this work include 1) that some of the increase in complexity in passing from 3 to 4 and 5 body problems in 3-d is already present in the more-well known setting of passing from intervals to triangles and then to quadrilaterals in 2-d. 2) That not (d, N) = (3, 6) but (4, 6) is a natural theoretical successor of (3, 5). 3) Such consideration isotropy groups and orbits is moreover a model for a larger case of interest, namely that of GR's reduced configuration spaces. The current Article presents the lower-d cases explicitly: 0, 1 and 2-d, including also the topological and geometrical form of the corresponding isotropy groups and orbits.