Wavelet approach to accelerator problems. II. Metaplectic wavelets

Author

Fedorova, A. ; Zeitlin, M. ; Parsa, Z.

Author_Institution

Inst. of Problems & Mech. Eng., Acad. of Sci., St. Petersburg, Russia

Volume

2

fYear

1997

fDate

12-16 May 1997

Firstpage

1505

Abstract

This is the second part of a series of talks in which we present applications of wavelet analysis to polynomial approximations for a number of accelerator physics problems. According to the orbit method and by using construction from the geometric quantization theory we construct the symplectic and Poisson structures associated with generalized wavelets by using metaplectic structure and corresponding polarization. The key point is a consideration of the semidirect product of the Heisenberg group and metaplectic group as subgroup of the automorphism group dual to the symplectic space, which consists of elements acting by affine transformations

Keywords

chaos; group theory; particle beam dynamics; polynomial approximation; wavelet transforms; Heisenberg group; Poisson structure; accelerator physics; affine transformations; automorphism group; generalized wavelets; geometric quantization; homoclinic chaos; metaplectic wavelets; orbit method; perturbed Hamiltonian systems; polynomial approximation; symplectic space; symplectic structure; wavelet; Algebra; Chaos; Laboratories; Mechanical engineering; Physics; Polarization; Polynomials; Quantization; Wavelet analysis; Wavelet transforms;

fLanguage

English

Publisher

ieee

Conference_Titel

Particle Accelerator Conference, 1997. Proceedings of the 1997

Conference_Location

Vancouver, BC

Print_ISBN

0-7803-4376-X

Type

conf

DOI

10.1109/PAC.1997.750741

Filename

750741