Quantum mechanics for Hamiltonians defined as quadratic forms

Resource Information

The work Quantum mechanics for Hamiltonians defined as quadratic forms represents a distinct intellectual or artistic creation found in University of Missouri Libraries. This resource is a combination of several types including: Work, Language Material, Books.

Label

Quantum mechanics for Hamiltonians defined as quadratic forms

Statement of responsibility

by Barry Simon

Creator

• Simon, Barry, 1946-

Subject

• Forms, Quadratic
• Hamiltonian operator
• Hamiltonian operator
• SCIENCE/Physics/Quantum Theory
• Scattering (Physics)
• Scattering (Physics)
• Forms, Quadratic

Language

eng

Summary

"It is our purpose in this monograph to present a complete, rigorous mathematical treatment of two body quantum mechanics for a wider class of potentials than is normally treated in the literature. work: At the same time, we will review the theory of the "usual" Kato classes, although no at U{u031B} tempt has been made to make this review exhaustive or complete. The scope of what we present is best delineated by stating the limits of this we take for granted the standard Hilbert space formalism, and our main goal is to prove forward dispersion relations from first principles. For example we do not assume the Lippman-Schwinger equation but prove it within the framework of time-dependent scattering theory."--Introduction

Member of

• Princeton series in physics

Cataloging source

IDEBK

Dewey number

530.1/2

Illustrations

illustrations

Index

index present

Language note

In English

LC call number

QC174.5 -- S56 1971eb

Literary form

non fiction

Nature of contents

• dictionaries
• bibliography

Series statement

Princeton series in physics