Dependence on aspect ratio of symmetry breaking for oscillating foils: implications for flapping flight
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Publication:2810491
DOI10.1017/jfm.2015.661zbMath1359.76358OpenAlexW2604755988MaRDI QIDQ2810491
Publication date: 1 June 2016
Published in: Journal of Fluid Mechanics (Search for Journal in Brave)
Full work available at URL: https://www.repository.cam.ac.uk/handle/1810/252476
Fluid-solid interactions (including aero- and hydro-elasticity, porosity, etc.) (74F10) Physiological flow (92C35) Biopropulsion in water and in air (76Z10)
Related Items (7)
Flow regimes for a square cross-section cylinder in oscillatory flow ⋮ Fluid–solid Floquet stability analysis of self-propelled heaving foils ⋮ Contrasting thrust generation mechanics and energetics of flapping foil locomotory states characterized by a unified - scaling ⋮ Self-propulsion of flapping bodies in viscous fluids: recent advances and perspectives ⋮ Horizontal locomotion of a vertically flapping oblate spheroid ⋮ Oscillatory flow regimes around four cylinders in a diamond arrangement ⋮ Collective locomotion of two-dimensional lattices of flapping plates. Part 1. Numerical method, single-plate case and lattice input power
Cites Work
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- Computational Methods for Fluid Dynamics
- Locomotion of a passively flapping flat plate
- Direct numerical simulation of oscillatory flow around a circular cylinder at low Keulegan–Carpenter number
- Travelling circular waves in axisymmetric rotating convection
- Modulated rotating convection: radially travelling concentric rolls
- Surprising behaviors in flapping locomotion with passive pitching
- A model for the symmetry breaking of the reverse Bénard–von Kármán vortex street produced by a flapping foil
- Mechanics of Swimming and Flying
- Symmetry breaking leads to forward flapping flight
- Three-dimensional analysis of the unidirectional oscillatory flow around a circular cylinder at low Keulegan–Carpenter and $\beta$ numbers
- Effects of geometric shape on the hydrodynamics of a self-propelled flapping foil
- The primary and secondary instabilities of flow generated by an oscillating circular cylinder
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