Euclidean Jordan Algebras, Hidden Actions, and J-Kepler Problems

Abstract

For a simple Euclidean Jordan algebra, let co be its conformal algebra, P be the manifold consisting of its semi-positive rank-one elements, C∞( P) be the space of complex-valued smooth functions on P. An explicit action of co on C∞( P), referred to as the hidden action of co on P, is exhibited. This hidden action turns out to be mathematically responsible for the existence of the Kepler problem and its recently-discovered vast generalizations, referred to as J-Kepler problems. The J-Kepler problems are then reconstructed and re-examined in terms of the unified language of Euclidean Jordan algebras. As a result, for a simple Euclidean Jordan algebra, the minimal representation of its conformal group can be realized either as the Hilbert space of bound states for its J-Kepler problem or as L2( P, 1 rvol), where vol is the volume form on P and r is the inner product of x∈ P with the identity element of the Jordan algebra.