Bound states of the N-dimensional Klein-Gordon equation with vector and scalar Coulomb potentials

Tutik, R S

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Bound states of the N-dimensional Klein-Gordon equation with vector and scalar Coulomb potentials

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Abstract

The existence of bound states for the N-dimensional Klein-Gordon equation with vector and scalar Coulomb potentials is shown. The effects of the coupling strength on the bound states are discussed. The connection of the obtained energy eigenvalues with the spectrum of the Dirac equation is pointed out. 21 refs. (author).

Authors:

Tutik, R S

Publication Date:

Dec 31, 1992

Product Type:

Technical Report

Report Number:

ITP-92-13

Reference Number:

SCA: 662100; PA: AIX-24:024391; SN: 93000948266

Resource Relation:

Other Information: PBD: 1992

Subject:

72 PHYSICS OF ELEMENTARY PARTICLES AND FIELDS; BOUND STATE; KLEIN-GORDON EQUATION; ANALYTICAL SOLUTION; COULOMB FIELD; DIRAC EQUATION; EIGENVALUES; SCALAR FIELDS; VECTOR FIELDS; 662100; GENERAL THEORY OF PARTICLES AND FIELDS

OSTI ID:

10127903

Research Organizations:

AN Ukrainskoj SSR, Kiev (Ukraine). Inst. Teoreticheskoj Fiziki

Country of Origin:

Ukraine

Language:

English

Other Identifying Numbers:

Other: ON: DE93617650; TRN: UA9300032024391

Availability:

OSTI; NTIS (US Sales Only); INIS

Submitting Site:

INIS

Size:

[8] p.

Announcement Date:

Jul 04, 2005

Citation Formats

Tutik, R S. Bound states of the N-dimensional Klein-Gordon equation with vector and scalar Coulomb potentials. Ukraine: N. p., 1992. Web.

Tutik, R S. Bound states of the N-dimensional Klein-Gordon equation with vector and scalar Coulomb potentials. Ukraine.

Tutik, R S. 1992. "Bound states of the N-dimensional Klein-Gordon equation with vector and scalar Coulomb potentials." Ukraine.

@misc{etde_10127903,
title = {Bound states of the N-dimensional Klein-Gordon equation with vector and scalar Coulomb potentials}
author = {Tutik, R S}
abstractNote = {The existence of bound states for the N-dimensional Klein-Gordon equation with vector and scalar Coulomb potentials is shown. The effects of the coupling strength on the bound states are discussed. The connection of the obtained energy eigenvalues with the spectrum of the Dirac equation is pointed out. 21 refs. (author).}
place = {Ukraine}
year = {1992}
month = {Dec}
}

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