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Adjusted Levermore-Pomraning equations for diffusive random systems in slab geometry

This paper presents a multiple length-scale asymptotic analysis for transport problems in 1-D diffusive random media. This analysis shows that the Levermore-Pomraning (LP) equations can be adjusted in order to achieve the correct asymptotic behavior. This adjustment appears in the form of a rescaling of the Markov transition functions by a factor $η$, which can be chosen in a simple way. Numerical results are given that (i) validate the theoretical predictions; and (ii) show that the adjusted LP equations greatly outperform the standard LP model for this class of transport problems.

preprint2014arXivOpen access
Richard VasquesNitin K. Yadav
math.APmath-phmath.MP
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Richard VasquesNitin K. Yadav

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