Canonical phase and its geometrical invariance

We develop two topics in parallel and show their inter-relation. The first centers on the notion of a fractional-differentiable structure on a commutative or a non-commutative space. We call this study quantum harmonic analysis. The second concerns homotopy invariants for these spaces and is an aspe

Exact coherent states describing the invariant-angle variables for the time-dependent singular oscillator are constructed. Through the use of these coherent states we show how to derive the nonadiabatic Hannay's angle from nonadiabatic Berry's phase and also we get the exact classical evolution from

For the set of linear dynamic systems with a given number of inputs and outputs, a complete set of independent invariants may be constructed and used to create state space and transfer function canonical forms. Snmmary--This paper is a study of the problem of how to parametfize the set of all finit

We prove an identity in the double algebra of a Peano space, using techniques first developed by Doubilet, Rota, and Stein, which yields a class of geometric identities in \(n\)-dimensional projective space. Special cases of this identity include a theorem of Bricard in the projective plane and one