2001
DOI: 10.3327/jnst.38.161
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Wavelet-Based Algorithms for Solving Neutron Diffusion Equations.

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Cited by 2 publications
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“…Wavelets can build a basis for differential equation discretisation 4 and solving, [5][6][7] and the solvers have been developed and tested in various fields of science from diffusion to electromagnetic waves. [8][9][10][11] In electronic structure calculations, wavelet basis has been present since the early nineties, [12][13][14][15] and in the previous decade both a wavelet based 13,14,16 and a multiwavelet based [17][18][19] solver have been developed with chemical accuracy and massively parallel computational possibilities. These solvers mostly use two resolution levels, but adaptively refining solution schemes are also given for simpler systems.…”
Section: Introductionmentioning
confidence: 99%
“…Wavelets can build a basis for differential equation discretisation 4 and solving, [5][6][7] and the solvers have been developed and tested in various fields of science from diffusion to electromagnetic waves. [8][9][10][11] In electronic structure calculations, wavelet basis has been present since the early nineties, [12][13][14][15] and in the previous decade both a wavelet based 13,14,16 and a multiwavelet based [17][18][19] solver have been developed with chemical accuracy and massively parallel computational possibilities. These solvers mostly use two resolution levels, but adaptively refining solution schemes are also given for simpler systems.…”
Section: Introductionmentioning
confidence: 99%