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Optimal Length of Low Reynolds Number Nanopropellers
Nano Letters, 2015Locomotion in fluids at the nanoscale is dominated by viscous drag. One efficient propulsion scheme is to use a weak rotating magnetic field that drives a chiral object. From bacterial flagella to artificial drills, the corkscrew is a universally useful chiral shape for propulsion in viscous environments.
Walker (Schamel), D. +4 more
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2015
Abstract This chapter uses asymptotic analysis to study low-Reynolds-number viscous flows. It considers two classical problems of low-Reynolds-number flow theory: flow past a sphere and past a circular cylinder. When dealing with the sphere flow, the chapter shows that in the ‘inner region’ the Navier–Stoke’s equations reduce, in the ...
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Abstract This chapter uses asymptotic analysis to study low-Reynolds-number viscous flows. It considers two classical problems of low-Reynolds-number flow theory: flow past a sphere and past a circular cylinder. When dealing with the sphere flow, the chapter shows that in the ‘inner region’ the Navier–Stoke’s equations reduce, in the ...
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Low Reynolds number fluidic flowmetering
Journal of Physics E: Scientific Instruments, 1988The capability of flowmeters to function at small Reynolds numbers (
R F Boucher, C Mazharoglu
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Turbulence statistics in fully developed channel flow at low Reynolds number
Journal of Fluid Mechanics, 1987John Kim, P. Moin, R. Moser
semanticscholar +1 more source
2001
Abstract Flows at low Reynolds number, a concept introduced in Chapter 2, are characterized by the fact that viscosity effects dominate inertial ones. The Stokes equation, which describes these flows, is linear, because the convective non-linear term (∇. ∇) ∇ can be neglected.
Etienne Guyon +3 more
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Abstract Flows at low Reynolds number, a concept introduced in Chapter 2, are characterized by the fact that viscosity effects dominate inertial ones. The Stokes equation, which describes these flows, is linear, because the convective non-linear term (∇. ∇) ∇ can be neglected.
Etienne Guyon +3 more
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XFOIL: An Analysis and Design System for Low Reynolds Number Airfoils
, 1989M. Drela
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Modeling Low Reynolds Number Incompressible Flows Using SPH
, 1997J. Morris, P. Fox, Yi Zhu
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Wakes of elliptical cylinders at low Reynolds number
, 2020Xiaoyu Shi, Mahbub Alam, H. Bai
semanticscholar +1 more source
1977
The Reynolds number — introduced in the last chapter in the context of dynamical similarity — can be given a physical interpretation. This is useful in gaining an understanding of the dynamical processes that are important in different Reynolds number ranges, and in formulating corresponding approximations to the equations of motion.
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The Reynolds number — introduced in the last chapter in the context of dynamical similarity — can be given a physical interpretation. This is useful in gaining an understanding of the dynamical processes that are important in different Reynolds number ranges, and in formulating corresponding approximations to the equations of motion.
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Cancer treatment and survivorship statistics, 2022
Ca-A Cancer Journal for Clinicians, 2022Kimberly D Miller +2 more
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