Abstract
Solving the neutron transport equations is a demanding computational challenge. This paper combines reduced-order modelling with domain decomposition to develop an approach that can tackle such problems. The idea is to decompose the domain of a reactor, form basis functions locally in each sub-domain and construct a reduced-order model from this. Several different ways of constructing the basis functions for local sub-domains are proposed, and a comparison is given with a reduced-order model that is formed globally. A relatively simple one-dimensional slab reactor provides a test case with which to investigate the capabilities of the proposed methods. The results show that domain decomposition reduced-order model methods perform comparably with the global reduced-order model when the total number of reduced variables in the system is the same with the potential for the offline computational cost to be significantly less expensive.
Funder
EPSRC Centre for Doctoral Training in Nuclear Energy
Subject
Energy (miscellaneous),Energy Engineering and Power Technology,Renewable Energy, Sustainability and the Environment,Electrical and Electronic Engineering,Control and Optimization,Engineering (miscellaneous)
Reference35 articles.
1. Introduction to Model Order Reduction;Schilders,2008
2. Model reduction via proper orthogonal decomposition;Pinnau,2008
3. Galerkin proper orthogonal decomposition methods for parabolic problems
4. Turbulence, Coherent Structures, Dynamical Systems and Symmetry;Holmes,2012
5. The structure of inhomogeneous turbulent flows;Lumley,1967
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