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Efficient reduced order model based on the proper orthogonal decomposition for time-dependent MOC calculations

Kosuke Tsujita, Tomohiro Endo, Akio Yamamoto

2022Journal of Nuclear Science and Technology10 citationsDOIOpen Access PDF

Abstract

An efficient reduced order model (ROM) for time-dependent transport calculations using the method of characteristics (MOC) is proposed. In the present ROM, the flux distributions and the net neutron currents between the adjacent unstructured mesh regions are taken from the MOC solution. Then, the coefficient matrices for the MOC-equivalent diffusion equation are reconstructed from them. The proper orthogonal decomposition (POD) is applied for the MOC-equivalent diffusion equation to reduce the degree of freedoms (DOFs) using the orthogonal bases obtained by the singular value decomposition (SVD) for the sampled MOC solution. The accuracy and computation time of the present ROM are verified in the C5G7-TD 2D benchmark problem. The calculation results show that the present ROM enables us approximately 5000–6000 times faster computation than the full order model (FOM) for kinetic calculations itself in the present calculation condition. The present method can be substituted as real-time simulations without the spatial homogenization when typical flux distributions and the net neutron currents of a target problem can be precalculated.

Topics & Concepts

Proper orthogonal decompositionDecompositionOrder (exchange)Computer scienceApplied mathematicsMathematicsChemistryPhysicsThermodynamicsOrganic chemistryFinanceTurbulenceEconomicsModel Reduction and Neural NetworksProbabilistic and Robust Engineering DesignNuclear reactor physics and engineering