You need JavaScript to view this

Heterogeneous Two-group Diffusion Theory for a Finite Cylindrical Reactor

Abstract

The source and sink method given by Feinberg and Galanin is extended to a finite cylindrical reactor. The two-group diffusion theory formulation is chosen primarily because of the relatively simple formulae emerging. A machine programme, calculating the criticality constant thermal utilization and the relative number of thermal absorptions in fuel rods, has been developed for the Ferranti-Mercury Computer.
Publication Date:
Jun 15, 1961
Product Type:
Technical Report
Report Number:
AE-57
Resource Relation:
Other Information: 15 refs., 1 fig.
Subject:
22 GENERAL STUDIES OF NUCLEAR REACTORS; DIFFUSION; CYLINDRICAL CONFIGURATION; CRITICALITY; TWO-DIMENSIONAL CALCULATIONS; REACTOR KINETICS; ZERO POWER REACTORS
OSTI ID:
20923716
Research Organizations:
AB Atomenergi, Stockholm (Sweden)
Country of Origin:
Sweden
Language:
English
Other Identifying Numbers:
TRN: SE0708246
Availability:
Commercial reproduction prohibited; OSTI as DE20923716
Submitting Site:
SWDN
Size:
30 pages
Announcement Date:
Sep 27, 2007

Citation Formats

Jonsson, Alf, and Naeslund, Goeran. Heterogeneous Two-group Diffusion Theory for a Finite Cylindrical Reactor. Sweden: N. p., 1961. Web.
Jonsson, Alf, & Naeslund, Goeran. Heterogeneous Two-group Diffusion Theory for a Finite Cylindrical Reactor. Sweden.
Jonsson, Alf, and Naeslund, Goeran. 1961. "Heterogeneous Two-group Diffusion Theory for a Finite Cylindrical Reactor." Sweden.
@misc{etde_20923716,
title = {Heterogeneous Two-group Diffusion Theory for a Finite Cylindrical Reactor}
author = {Jonsson, Alf, and Naeslund, Goeran}
abstractNote = {The source and sink method given by Feinberg and Galanin is extended to a finite cylindrical reactor. The two-group diffusion theory formulation is chosen primarily because of the relatively simple formulae emerging. A machine programme, calculating the criticality constant thermal utilization and the relative number of thermal absorptions in fuel rods, has been developed for the Ferranti-Mercury Computer.}
place = {Sweden}
year = {1961}
month = {Jun}
}