Lamb vector

{{Short description|Mathematical object used in fluid dynamics}}

In fluid dynamics, Lamb vector is the cross product of vorticity vector and velocity vector of the flow field, named after the physicist Horace Lamb.Lamb, H. (1932). Hydrodynamics, Cambridge Univ. Press,, 134–139.Truesdell, C. (1954). The kinematics of vorticity (Vol. 954). Bloomington: Indiana University Press. The Lamb vector is defined as

:$\backslash mathbf\; l\; =\; \backslash mathbf\{u\}\; \backslash times\; \backslash boldsymbol\{\backslash omega\}$

where $\backslash mathbf\{u\}$ is the velocity field and $\backslash boldsymbol\{\backslash omega\}=\backslash nabla\backslash times\backslash mathbf\{u\}$ is the vorticity field of the flow. It appears in the Navier–Stokes equations through the material derivative term, specifically via convective acceleration term,

:$\backslash mathbf\; u\backslash cdot\; \backslash nabla\backslash mathbf\; u\; =\; \backslash frac\{1\}\{2\}\backslash nabla\backslash mathbf\; u^2\; -\; \backslash mathbf\{u\}\backslash times\backslash boldsymbol\{\backslash omega\}\; =\; \backslash frac\{1\}\{2\}\backslash nabla\backslash mathbf\; u^2\; -\; \backslash mathbf\; l$

In irrotational flows, the Lamb vector is zero, so does in Beltrami flows. The concept of Lamb vector is widely used in turbulent flows. The Lamb vector is analogous to electric field, when the Navier–Stokes equation is compared with Maxwell's equations.