Representations of theMatrix in Terms of Its Angular Momentum Poles
- 1 February 1963
- journal article
- research article
- Published by American Physical Society (APS) in Physical Review B
- Vol. 129 (3) , 1445-1452
- https://doi.org/10.1103/physrev.129.1445
Abstract
The asymptotic distribution of poles of the nonrelativistic matrix for potential scattering in the complex angular momentum plane is investigated, and so is the nature of the pole trajectories near . As a consequence of the behavior of the distant poles and of their residues the matrix is shown to be representable in the form of an infinite (Weierstrass-Hadamard) product as well as in the form of a (Mittag-Leffler) series of partial fractions.
Keywords
This publication has 11 references indexed in Scilit:
- Angular Momentum Poles of the NonrelativisticSMatrix for Spin ½ ParticlesPhysical Review B, 1963
- Singularities in Angular Momentum of the Scattering Amplitude for a Class of Soluble PotentialsPhysical Review B, 1962
- Nonrelativistic S-Matrix Poles for Complex Angular MomentaJournal of Mathematical Physics, 1962
- Complex Angular Momentum in Relativistic-Matrix TheoryPhysical Review B, 1962
- Meromorphic Property of theMatrix in the Complex Plane of Angular MomentumPhysical Review B, 1962
- On the continuation of partial-wave amplitudes to complexlIl Nuovo Cimento (1869-1876), 1962
- Experimental Consequences of the Hypothesis of Regge PolesPhysical Review B, 1962
- Bound states, shadow states and mandelstam representationIl Nuovo Cimento (1869-1876), 1960
- Analytic Properties of Radial Wave FunctionsJournal of Mathematical Physics, 1960
- Introduction to complex orbital momentaIl Nuovo Cimento (1869-1876), 1959