A slender body theory for the motion of special Cosserat filaments in Stokes flow

Garg, Mohit; Kumar, Ajeet

doi:10.1177/10812865221083323

Cited by 7 publications

(2 citation statements)

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“…Other approaches to this stiff numerical problem with different treatments of the hydrodynamics have recently been developed. [69][70][71][72][73][74][75][76][77][78] The parameters (Z, D, t f ) = (2, 10 À3 , 10 À2 ), timestep size Dt = 10 À3 , and spatial gridspacing Ds = 1/64 are fixed for the duration unless otherwise stated.…”

Section: Active Kirchhoff Rod Modelmentioning

confidence: 99%

Self-buckling and self-writhing of semi-flexible microorganisms

Lough,

Weibel,

Spagnolie

2023

Soft Matter

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Section: Active Kirchhoff Rod Modelmentioning

confidence: 99%

Self-buckling and self-writhing of semi-flexible microorganisms

Lough,

Weibel,

Spagnolie

2023

Soft Matter

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“…Recent work has focused on placing these theories back in the context of three-dimensional well-posed partial differential equations (PDEs) (Koens & Lauga 2018; Mori, Ohm & Spirn 2020 a , b ; Mori & Ohm 2021). In particular, it has been shown that SBT can be derived from a three-dimensional boundary integral equation (Koens & Lauga 2018; Garg & Kumar 2022), and that its solution is an approximation to a Stokes PDE with mixed Dirichlet–Neumann boundary data and a boundary condition that the fibre maintain the integrity of its cross-section (Mori et al. 2020 a , b ; Mori & Ohm 2021).…”

Section: Introductionmentioning

confidence: 99%

Slender body theories for rotating filaments

Maxian

Donev

2022

J. Fluid Mech.

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Slender fibres are ubiquitous in biology, physics and engineering, with prominent examples including bacterial flagella and cytoskeletal fibres. In this setting, slender body theories (SBTs), which give the resistance on the fibre asymptotically in its slenderness $\epsilon$ , are useful tools for both analysis and computations. However, a difficulty arises when accounting for twist and cross-sectional rotation: because the angular velocity of a filament can vary depending on the order of magnitude of the applied torque, asymptotic theories must give accurate results for rotational dynamics over a range of angular velocities. In this paper, we first survey the challenges in applying existing SBTs, which are based on either singularity or full boundary integral representations, to rotating filaments, showing in particular that they fail to consistently treat rotation–translation coupling in curved filaments. We then provide an alternative approach which approximates the three-dimensional dynamics via a one-dimensional line integral of Rotne–Prager–Yamakawa regularized singularities. While unable to accurately resolve the flow field near the filament, this approach gives a grand mobility with symmetric rotation–translation and translation–rotation coupling, making it applicable to a broad range of angular velocities. To restore fidelity to the three-dimensional filament geometry, we use our regularized singularity model to inform a simple empirical equation which relates the mean force and torque along the filament centreline to the translational and rotational velocity of the cross-section. The single unknown coefficient in the model is estimated numerically from three-dimensional boundary integral calculations on a rotating, curved filament.

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