Convergence Acceleration for the Kohn Variational Method in the Presence of a Long-Range Interaction,

Abstract

The paper presents a distorted wave generalization of the S-matrix version of the Kohn variational principal developed by Zhang, Chu, and Miller J. Chem. Phys. 88, 10 (1988). For scattering in the presence of a long range interaction, the large-r asymptotic solution to the Schrodinger equation is built into the Kohn variational principal order by order in an effort to accelerate convergence of the short-range square integrable part of the basis set expansion. The improvement in the rate of convergence is demonstrated by applying the method to a long-range model potential. Multichannel scattering is discussed. (AN)

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Document Details

Document Type
Technical Report
Publication Date
Sep 06, 1995
Accession Number
ADA298792

Entities

People

  • Ramesh D. Sharma
  • Robert C. Forrey
  • Robert N. Hill

Organizations

  • Phillips Laboratory

Tags

DTIC Thesaurus Topics

  • Air Force
  • Air Force Facilities
  • Astronomy
  • Astrophysics
  • Convergence
  • Delaware
  • Equations
  • Information Operations
  • Mathematics
  • Physical Properties
  • Physics
  • Scattering
  • Schrodinger Equation
  • Three Dimensional
  • Two Dimensional
  • Universities
  • Variational Methods

Fields of Study

  • Physics

Readers

  • Aerospace Test and Evaluation
  • Quantum spin resonance or Electron Paramagnetic Resonance spectroscopy.
  • Wave Propagation and Nonlinear Chaotic Dynamics.