Modelling solute transport in the brain microcirculation: is it really well mixed inside the blood vessels?

Most network models describing solute transport in the brain microcirculation use the well-mixed hypothesis and assume that radial gradients inside the blood vessels are negligible. Recent experimental data suggest that these gradients, which may result from heterogeneities in the velocity field or...

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Veröffentlicht in:	Journal of fluid mechanics 2020-02, Vol.884, Article A39
Hauptverfasser:	Berg, Maxime, Davit, Yohan, Quintard, Michel, Lorthois, Sylvie
Format:	Artikel
Sprache:	eng
Schlagworte:	Biomechanics Blood vessels Blood-brain barrier Boundary conditions Brain Coefficients Computational neuroscience Coupling (molecular) Dispersion Engineering Sciences Exchange coefficients Exchanging Fluid mechanics Fluids mechanics Gradients Hypotheses Mechanics Microscopy Reactive fluid environment Solute transport Solutes Spatial distribution Tissue Transport Tubes Velocity Velocity distribution
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description	Most network models describing solute transport in the brain microcirculation use the well-mixed hypothesis and assume that radial gradients inside the blood vessels are negligible. Recent experimental data suggest that these gradients, which may result from heterogeneities in the velocity field or consumption in the tissue, may in fact be important. Here, we study the validity of the well-mixed hypothesis in network models of solute transport using theoretical and computational approaches. We focus on regimes of weak coupling where the transport problem inside the vasculature is independent of the concentration field in the tissue. In these regimes, the boundary condition between vessels and tissue can be modelled by a Robin boundary condition. For this boundary condition and for a single cylindrical capillary, we derive a one-dimensional cross-section average transport problem with dispersion and exchange coefficients capturing the effects of radial gradients. We then extend this model to a network of connected tubes and solve the problem in a complex anatomical network. By comparing with results based on the well-mixed hypothesis, we find that dispersive effects are a fundamental component of transport in transient situations with relatively rapid injections, i.e. frequencies above one Hertz. For slowly varying signals and steady states, radial gradients also significantly impact the spatial distribution of vessel/tissue exchange for molecules that easily cross the blood brain barrier. This suggests that radial gradients cannot be systematically neglected and that there is a crucial need to determine the impact of spatio-temporal heterogeneities on transport in the brain microcirculation.
doi_str_mv	10.1017/jfm.2019.866
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subjects	Biomechanics Blood vessels Blood-brain barrier Boundary conditions Brain Coefficients Computational neuroscience Coupling (molecular) Dispersion Engineering Sciences Exchange coefficients Exchanging Fluid mechanics Fluids mechanics Gradients Hypotheses Mechanics Microscopy Reactive fluid environment Solute transport Solutes Spatial distribution Tissue Transport Tubes Velocity Velocity distribution
title	Modelling solute transport in the brain microcirculation: is it really well mixed inside the blood vessels?
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