$L_P $ and Eigenvalue Error Estimates for the Discrete Ordinates Method for Two-Dimensional Neutron Transport
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Publication:3821541
DOI10.1137/0726005zbMath0668.65119OpenAlexW2168355833MaRDI QIDQ3821541
Publication date: 1989
Published in: SIAM Journal on Numerical Analysis (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1137/0726005
convergenceneutron transport equationError estimatespost processingeigenvalue error estimatesNyström discrete ordinates method
Numerical methods for integral equations (65R20) Integro-partial differential equations (45K05) Transport processes in time-dependent statistical mechanics (82C70)
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SPATIALLY VARYING DISCRETE ORDINATES METHODS IN XY-GEOMETRY ⋮ SPATIALLY VARYING DISCRETE ORDINATES METHODS IN XY-GEOMETRY ⋮ Analysis of a full discretization scheme for \(2D\) radiative-conductive heat transfer systems ⋮ On the approximation of the leading eigenelements for a class of transport operators ⋮ Note on the solution of transport equation by Tau method and Walsh functions ⋮ Chebyshev spectral-\(S_N\) method for the neutron transport equation ⋮ Two-dimensional transport equation as Fredholm integral equation ⋮ CONVERGENCE OF A DISCONTINUOUS GALERKIN SCHEME FOR THE NEUTRON TRANSPORT ⋮ AN OPTIMALITY CONDITION FOR THE ASSEMBLY DISTRIBUTION IN A NUCLEAR REACTOR
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