1975-03
21-26
articles
https://scigraph.springernature.com/explorer/license/
1975-03-01
http://link.springer.com/10.1007/BF02148281
false
research_article
en
2019-04-11T12:12
The concept of Banach-adjoint transformation in a Lebesgue space Lp(p⩾1) is extensively used for proving the existence, the uniqueness and other basic properties of the solution to the stationary linear integral transport equation for the neutron flux in a three-dimensional inhomogeneous body. A practical solution of the problem is also constructed via a suitable polynomial expansion which is shown to converge in the mean of index one on the domain D occupied by the body considered.
Practical solution for a three-dimensional problem of integral neutron transport theory
Spiga
G.
10
Springer Nature - SN SciGraph project
readcube_id
22b18a7913d4788932f5465663916397bb46d16aa7b64e225e4717a4712e3032
dimensions_id
pub.1007283609
Mathematical Sciences
Boffi
V. C.
Pure Mathematics
Laboratorio di Ingegneria Nucleare della Università di Bologna, Italy
University of Bologna
1
10.1007/bf02148281
doi
1572-9648
Meccanica
0025-6455