Derives a cell problem for asymptotic Taylor-Aris dispersion of rods in polygonal ducts that replaces uniform area weighting with a non-uniform invariant density and separates alignment effects on sampling versus transverse mixing.
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2 Pith papers cite this work. Polarity classification is still indexing.
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Pith papers citing it
fields
physics.flu-dyn 2years
2026 2verdicts
UNVERDICTED 2representative citing papers
Tensorial Taylor-Aris theory for dilute Brownian rods in circular Poiseuille flow shows shear-induced alignment raises the effective Taylor dispersion coefficient by up to 30% in the slender limit.
citing papers explorer
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Transient and asymptotic Taylor--Aris dispersion of Brownian rods in arbitrary regular-polygonal ducts
Derives a cell problem for asymptotic Taylor-Aris dispersion of rods in polygonal ducts that replaces uniform area weighting with a non-uniform invariant density and separates alignment effects on sampling versus transverse mixing.
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Shear alignment and tensorial Taylor--Aris dispersion of Brownian rods in a circular tube
Tensorial Taylor-Aris theory for dilute Brownian rods in circular Poiseuille flow shows shear-induced alignment raises the effective Taylor dispersion coefficient by up to 30% in the slender limit.