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Multigroup neutron transport equation in the diffusion and P{sub 1} approximation

Abstract

Investigations of the properties of the multigroup transport operator, width and without delayed neutrons in the diffusion and P{sub 1} approximation, is performed using Keldis's theory of operator families as well as a technique . recently used for investigations into the properties of the general linearized Boltzmann operator. It is shown that in the case without delayed neutrons, multigroup transport operator in the diffusion and P{sub 1} approximation possesses a complete set of generalized eigenvectors. A formal solution to the initial value problem is also given. (author)
Authors:
Obradovic, D [1] 
  1. Boris Kidric Institute of nuclear sciences Vinca, Belgrade (Yugoslavia)
Publication Date:
Jul 01, 1970
Product Type:
Miscellaneous
Report Number:
INIS-RS-1286
Resource Relation:
Other Information: 16 refs
Subject:
22 GENERAL STUDIES OF NUCLEAR REACTORS; BOLTZMANN EQUATION; EIGENVECTORS; MULTIGROUP THEORY; NEUTRON TRANSPORT THEORY; P1-APPROXIMATION
OSTI ID:
21021488
Country of Origin:
Serbia
Language:
English
Other Identifying Numbers:
TRN: RS08RB096043316
Availability:
Available from INIS in electronic form; Also available from the Institute of nuclear sciences Vinca
Submitting Site:
INIS
Size:
v. 2, 22 pages
Announcement Date:
May 23, 2008

Citation Formats

Obradovic, D. Multigroup neutron transport equation in the diffusion and P{sub 1} approximation. Serbia: N. p., 1970. Web.
Obradovic, D. Multigroup neutron transport equation in the diffusion and P{sub 1} approximation. Serbia.
Obradovic, D. 1970. "Multigroup neutron transport equation in the diffusion and P{sub 1} approximation." Serbia.
@misc{etde_21021488,
title = {Multigroup neutron transport equation in the diffusion and P{sub 1} approximation}
author = {Obradovic, D}
abstractNote = {Investigations of the properties of the multigroup transport operator, width and without delayed neutrons in the diffusion and P{sub 1} approximation, is performed using Keldis's theory of operator families as well as a technique . recently used for investigations into the properties of the general linearized Boltzmann operator. It is shown that in the case without delayed neutrons, multigroup transport operator in the diffusion and P{sub 1} approximation possesses a complete set of generalized eigenvectors. A formal solution to the initial value problem is also given. (author)}
place = {Serbia}
year = {1970}
month = {Jul}
}