Geometrical Tools for Quantum Euclidean Spaces

The quantum Euclidean spheres, S N-1 q , are (noncommutative) homogeneous spaces of quantum orthogonal groups, SO q (N). The \* -algebra A(S N-1 q ) of polynomial functions on each of these is given by generators and relations which can be expressed in terms of a self-adjoint, unipotent matrix. We e

Application of non-Euclidean geometry to the representation of data obtained from single frequency measurements has been made on two-port networks. especially in the microwave region. Lossless networks may be made the subject of a two-dimensional representation, but those providing loss as well as p

The internal coordinate space for three particles of arbitrary mass is shown to be a three-dimensional conformally Euclidean space. This gives the internal kinetic energy operator a simple form and provides a unified view of the different hyperspherical coordinates used in quantum three-body problem