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A: Atomphysik
A 18: Photoionisation II (joint session A and MO)
A 18.9: Vortrag
Freitag, 6. April 2001, 17:45–18:00, H1012
— •Nikolai L. Manakov1, Alexei V. Meremianin1, and Anthony F. Starace2 — 1Department of Physics, Voronezh State University, 394693 Voronezh, Russia — 2Department of Physics and Astronomy, The University of Nebraska, Lincoln, NE 68588-0111, USA
Separation of kinematical (i.e., dependent on the geometry, polarizations and momentum directions of the target and projectiles) and dynamical factors is the major problem in an analysis of angular distributions. We develop a general method for the parametrization of cross sections in terms of simple vector constructions, such as the scalar products of vectors inherent to the concrete problem and/or expansions in Legendre polynomials of angles between these vectors. The key idea of this method is to avoid the direct use of standard techniques of angular momenta algebra which require tedious routine calculations. In general, our approach is based on an invariant (i.e., independent of a concrete coordinate frame) analysis of the fundamental objects of angular momentum theory, irreducible tensor operators Tjm, using invariant representations of finite rotation matrices. In addition, we use the multipole expansions of tensor functions Tjm dependent on vector parameters and also reduction techniques for the tensor products of spherical harmonics.
We illustrate details of the method by analyzing of beyond electric-dipole-approximation effects on the polarization and angular dependences of photoprocesses in the VUV- and X-ray regions.