Lamb surface: Difference between revisions

Latest revision as of 15:48, 30 August 2023

Template:Short description In fluid dynamics, Lamb surfaces are smooth, connected orientable two-dimensional surfaces, which are simultaneously stream-surfaces and vortex surfaces, named after the physicist Horace Lamb.^[1]^[2]^[3] Lamb surfaces are orthogonal to the Lamb vector $ω \times 𝐮$ everywhere, where $ω$ and $𝐮$ are the vorticity and velocity field, respectively. The necessary and sufficient condition are

(ω \times 𝐮) \cdot [\nabla \times (ω \times 𝐮)] = 0, ω \times 𝐮 \neq 0 .

Flows with Lamb surfaces are neither irrotational nor Beltrami. But the generalized Beltrami flows has Lamb surfaces.

References

Template:Reflist

↑ Lamb, H. (1932). Hydrodynamics, Cambridge Univ. Press,, 134–139.
↑ Truesdell, C. (1954). The kinematics of vorticity (Vol. 954). Bloomington: Indiana University Press.
↑ Sposito, G. (1997). On steady flows with Lamb surfaces. International journal of engineering science, 35(3), 197–209.

[1] Lamb, H. (1932). Hydrodynamics, Cambridge Univ. Press,, 134–139.

[2] Truesdell, C. (1954). The kinematics of vorticity (Vol. 954). Bloomington: Indiana University Press.

[3] Sposito, G. (1997). On steady flows with Lamb surfaces. International journal of engineering science, 35(3), 197–209.

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Lamb surface: Difference between revisions

Latest revision as of 15:48, 30 August 2023

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Lamb surface: Difference between revisions

Latest revision as of 15:48, 30 August 2023

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