Why do red blood cells have asymmetric shapes even in a symmetric flow?
about
Alterations in red blood cell deformability during storage: a microfluidic approach.Experimental observation of the asymmetric instability of intermediate-reduced-volume vesicles in extensional flow.Fully automated digital holographic processing for monitoring the dynamics of a vesicle suspension under shear flowSlow sedimentation and deformability of charged lipid vesicles.Two-dimensional simulation of red blood cell motion near a wall under a lateral force.Tank treading of optically trapped red blood cells in shear flowViscoelastic transient of confined red blood cells.Modelling the Transport of Nanoparticles under Blood Flow using an Agent-based ApproachSingle-cell measurement of red blood cell oxygen affinity.Imaging morphodynamics of human blood cells in vivo with video-rate third harmonic generation microscopy.Continuum- and particle-based modeling of shapes and dynamics of red blood cells in health and disease.Prediction of noninertial focusing of red blood cells in Poiseuille flow.Multiscale modeling of blood flow: from single cells to blood rheology.Front microrheology of the non-Newtonian behaviour of blood: scaling theory of erythrocyte aggregation by aging.Local membrane length conservation in two-dimensional vesicle simulation using a multicomponent lattice Boltzmann equation method.Modeling performance of a two-dimensional capsule in a microchannel flow: long-term lateral migration.Numerical simulation of transient dynamic behavior of healthy and hardened red blood cells in microcapillary flow.Motion of red blood cells near microvessel walls: effects of a porous wall layer.The buckling instability of aggregating red blood cells.Phase diagrams and morphological evolution in wrapping of rod-shaped elastic nanoparticles by cell membrane: a two-dimensional study.A micro-scale simulation of red blood cell passage through symmetric and asymmetric bifurcated vessels.Two-dimensional numerical modeling for separation of deformable cells using dielectrophoresis.Microfluidics analysis of red blood cell membrane viscoelasticity.Rapid 3D fluorescence imaging of individual optically trapped living immune cells.Relationship between transit time and mechanical properties of a cell through a stenosed microchannel.Complexity of vesicle microcirculation.Multiple-component lattice Boltzmann equation for fluid-filled vesicles in flow.Behavior of rigid and deformable particles in deterministic lateral displacement devices with different post shapes.Vesicle dynamics in a confined Poiseuille flow: from steady state to chaos.Rheology of red blood cells under flow in highly confined microchannels: I. effect of elasticity.Symmetry breaking and cross-streamline migration of three-dimensional vesicles in an axial Poiseuille flow.Deformation and dynamics of red blood cells in flow through cylindrical microchannels.Squaring, parity breaking, and S tumbling of vesicles under shear flow.Lateral migration and equilibrium shape and position of a single red blood cell in bounded Poiseuille flows.Role of red blood cell elastic properties in capillary occlusions.Deformation of a single red blood cell in bounded Poiseuille flows.Microfabricated multiple field of view imaging flow cytometry.Symmetry breaking of vesicle shapes in Poiseuille flow.Optically active multi-helical erythrocyte-like Ln(OH)CO3 (Ln = La, Ce, Pr and Sm).Numerical simulations of the behaviour of a drop in a square pipe flow using the two-phase lattice Boltzmann method.
P2860
Q30588217-FD37992C-8B7B-40CD-8F4B-E59C058EFDD1Q30745251-DFECA327-4B0A-4907-AED7-482CA7CA1CB4Q33634547-8598A496-6BC7-4829-9C8B-51F53FFC4E8FQ34847888-CD1D13A8-995C-4F48-92F1-F43F9B89DDF8Q35095626-6F7B730E-EF41-4E87-97AA-C96E8D28D183Q35246351-3A203851-509C-49AC-A41B-04E2C4A8BD7DQ35578902-7EA93B7D-6A9B-4E80-85EF-95987428E139Q35710697-1BC715C4-763C-430B-9F8C-3CCDCEEEBFC1Q35961362-5C3BA65C-F0A4-45E4-8055-C469116695B3Q36383817-9E0F5A01-CBD1-4AB4-ADB5-08C06AF0A390Q36452267-36B49B18-8CFC-4FCE-B025-B4CC942F265AQ36614282-BE45E79A-B245-4D16-B4DF-46E82BFE13BAQ38106647-9580744E-CB67-4F29-B154-C94C3E4AC7A6Q38856276-DDF542FA-2942-4794-B6B6-3899004CC446Q39391320-C3BD581C-E4DC-4289-968C-D29CF9DBD5D0Q39834331-E682C93C-152E-4BAB-BD6B-DB5F99993752Q40146893-A6095F99-0BA0-472D-B355-4F59C6DA534CQ41342125-A0353C59-B99F-47E2-8DD4-3A77FD63F214Q41367341-7F301589-698D-44EF-8786-77C9327D73E1Q42206426-586C556D-3FDB-4A0E-B243-3A358F97E081Q42541572-5B37FB62-F0B6-4B43-A637-977F539F2183Q44093987-0DADA45A-B903-4031-8625-B3865DA24916Q45359890-1CC5BEE9-0E50-4FFA-8125-AE1BE27F707EQ46211005-DA195D1B-E3D6-47BE-AD96-8ED045E2A9C9Q47194893-3737DD71-0AAF-4F5F-8605-AD60CF99AC24Q47998007-577C5BC7-684E-497C-B038-C905631472D4Q48732485-F6AA7A71-A794-4E70-A18F-421E58EA0E5CQ50275729-06E46556-264D-48F4-8D6E-29D1F039C234Q50458505-CEC97354-D922-46F5-BABF-A4BFFA9FAFECQ50463067-1F1DB78C-38BA-4268-8D0A-4F415E38EB87Q50471452-AFCD6E6F-3A21-4C3C-97E8-C1A3A657F87CQ50473314-0090D2FD-88FA-41D0-A40B-C7BC22625285Q50495904-48C3E79D-66CC-4DDF-BAF1-122D5CD47EB1Q50499294-A3F2E922-3AD1-451D-8667-1E551110BD54Q50499298-AB052BA0-CABA-4943-8A5F-E2A025EE3676Q50515579-AF2E75B6-63F7-432E-99FC-FCFC48655946Q50523819-211EEAB8-F8CC-435B-8324-C6CBFC2CCF3EQ50527442-423A6FFA-5AD2-4B93-97C2-244DF00B7E3BQ51252821-137B9F56-57C0-4E5F-96FA-21A9BCC5D426Q51568355-A92B726A-3C43-4036-A566-C0795A635D76
P2860
Why do red blood cells have asymmetric shapes even in a symmetric flow?
description
2009 nî lūn-bûn
@nan
2009年の論文
@ja
2009年学术文章
@wuu
2009年学术文章
@zh-cn
2009年学术文章
@zh-hans
2009年学术文章
@zh-my
2009年学术文章
@zh-sg
2009年學術文章
@yue
2009年學術文章
@zh
2009年學術文章
@zh-hant
name
Why do red blood cells have asymmetric shapes even in a symmetric flow?
@en
Why do red blood cells have asymmetric shapes even in a symmetric flow?
@nl
type
label
Why do red blood cells have asymmetric shapes even in a symmetric flow?
@en
Why do red blood cells have asymmetric shapes even in a symmetric flow?
@nl
prefLabel
Why do red blood cells have asymmetric shapes even in a symmetric flow?
@en
Why do red blood cells have asymmetric shapes even in a symmetric flow?
@nl
P2093
P2860
P1476
Why do red blood cells have asymmetric shapes even in a symmetric flow?
@en
P2093
Badr Kaoui
Chaouqi Misbah
George Biros
P2860
P304
P356
10.1103/PHYSREVLETT.103.188101
P407
P577
2009-10-26T00:00:00Z