Vorticity equation vorticity equationfluid dynamics describes evolution of the vorticity of a particle of a fluid as it moves with its flow , that is, the local rotation of the fluid.material derivative operator, is the flow velocity , is the local fluid density , is the local pressure , is the viscous stress tensor and represents the sum of the external body forces. The first source term on the right hand side represents vortex stretching .Newtonian fluid .incompressible and isotropic fluids, with conservative body forces , the equation simplifies to the vorticity transport equation kinematic viscosity and is the Laplace operator .Physical interpretation The term on the left-hand side is the material derivative of the vorticity vector. It describes the rate of change of vorticity of the moving fluid particle . This change can be attributed to unsteadiness in the flow or due to the motion of the fluid particle as it moves from one point to another. The term on the right-hand side describes the stretching or tilting of vorticity due to the flow velocity gradients. Note that is a vector quantity , as is a scalar differential operator , while is a nine-element tensor quantity. The term describes stretching of vorticity due to flow compressibility. It follows from the Navier-Stokes equation for continuity , namely : The term is the baroclinic term . It accounts for the changes in the vorticity due to the intersection of density and pressure surfaces. The term, accounts for the diffusion of vorticity due to the viscous effects. The term provides for changes due to external body forces. These are forces that are spread over a three-dimensional region of the fluid, such as gravity or electromagnetic forces. or a line .Simplifications In case of conservative body forces,. For a barotropic fluid ,. This is also true for a constant density fluid where. Note that this is not the same as an incompressible flow , for which the barotropic term cannot be neglected. For inviscid fluids , the viscosity tensor is zero. inviscid , barotropic fluid with conservative body forces, the vorticity equation simplifies toinviscid fluid with conservative body forces, refer to .Derivation The vorticity equation can be derived from the Navier–Stokes equation for the conservation of angular momentum . In the absence of any concentrated torques and line forces, one obtainscurl of the flow velocity vector . Taking the curl of momentum equation yields the desired equation.scalar field .Tensor notation The vorticity equation can be expressed in tensor notation using Einstein's summation convention and the Levi-Civita symbol :In specific sciences Atmospheric sciences In the atmospheric sciences , the vorticity equation can be stated in terms of the absolute vorticity of air with respect to an inertial frame, or of the vorticity with respect to the rotation of the Earth . The absolute version iswind velocity , and is the 2-dimensional del .
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