vorticity vector - meaning and definition. What is vorticity vector
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What (who) is vorticity vector - definition

Vorticity Equation; Vorticity transport equation

free vector         
GEOMETRIC OBJECT THAT HAS MAGNITUDE (OR LENGTH) AND DIRECTION
Vector (classical mechanics); Three-vector; Vector sum; Vector addition; Spatial vector; Vector (physics); Vector subtraction; Relative vector; Spacial vector; Physical vector; Vector methods (physics); Vector component; Component (vector); Bound vector; Vector (spatial); Vector (geometry); Free vector; Vector (geometric); Triangle law; Euclidean vectors; Vector direction; Vector components; 3d vector; Euclid vector; 3D vector; Geometric vector; Magnitude of resultant vector; Euclidian vector; Vector quantity; Resultant vector; Antiparallel vectors
¦ noun Mathematics a vector of which only the magnitude and direction are specified, not the position or line of action.
Disease vector         
  • deer tick]], a vector for [[Lyme disease]] pathogens
  • Figure 1. This figure shows how the [[Flavivirus]] is carried by [[mosquito]]s in the [[West Nile virus]] and [[Dengue fever]]. The mosquito would be considered a disease vector.
AGENT THAT CARRIES AND TRANSMITS AN INFECTIOUS PATHOGEN INTO ANOTHER LIVING ORGANISM
Vector species; Insect-borne disease; Vector (epidemiology); Vector borne transmission; Vector (disease); Vector (parasitology); Insect vectors; Disease vectors; Insect vector; Contagion vector; Vector-borne disease; Disease-vector; Draft:Vector-Borne Disease; Vector competence; Vector-borne
In epidemiology, a disease vector is any living agent that carries and transmits an infectious pathogen to another living organism; agents regarded as vectors are organisms, such as parasites or microbes. The first major discovery of a disease vector came from Ronald Ross in 1897, who discovered the malaria pathogen when he dissected a mosquito.
vector graphics         
  • Example showing comparison of vector graphics and [[raster graphics]] upon [[magnification]]
  • vectorization]]
  • Detail can be added to or removed from vector art.
  • Asteroids]]''-like video game played on a [[vector monitor]]
  • This vector-based (SVG format) image of a round four-color swirl displays several unique features of vector graphics versus raster graphics: there is no [[aliasing]] along the rounded edge (which would result in [[digital artifacts]] in a raster graphic), the [[color gradient]]s are all smooth, and the user can resize the image infinitely without losing any quality.
COMPUTER GRAPHICS IMAGES DEFINED BY POINTS, LINES AND CURVES
Vector art; Vector Art; X-Y monitor; Xy monitor; Vector Graphics; Vector image; Vector drawing; Vector images; Object-oriented graphics; Object-Oriented Graphics; Vector version; Vector software; Vectorgraphic; Vector drawings; Vector graphic; Vector illustration; Vector image format; Conversion of vector graphics file formats; Vector artwork; Vector format
<graphics> (Sometimes called "object-oriented" graphics, though it's nothing to do with object-oriented programming). The representation of separate shapes such as lines, polygons and text, and groups of such objects, as opposed to bitmaps. The advantage of vector graphics ("drawing") programs over bitmap ("paint") editors is that multiple overlapping elements can be manipulated independently without using differenet layers for each one. It is also easier to render an object at different sizes and to transform it in other ways without worrying about image resolution and pixels. (2001-02-06)

Wikipedia

Vorticity equation

The vorticity equation of fluid dynamics describes the evolution of the vorticity ω of a particle of a fluid as it moves with its flow; that is, the local rotation of the fluid (in terms of vector calculus this is the curl of the flow velocity). The governing equation is:

where D/Dt is the material derivative operator, u is the flow velocity, ρ is the local fluid density, p is the local pressure, τ is the viscous stress tensor and B represents the sum of the external body forces. The first source term on the right hand side represents vortex stretching.

The equation is valid in the absence of any concentrated torques and line forces for a compressible, Newtonian fluid. In the case of incompressible flow (i.e., low Mach number) and isotropic fluids, with conservative body forces, the equation simplifies to the vorticity transport equation:

D ω D t = ( ω ) u + ν 2 ω {\displaystyle {\frac {D{\boldsymbol {\omega }}}{Dt}}=\left({\boldsymbol {\omega }}\cdot \nabla \right)\mathbf {u} +\nu \nabla ^{2}{\boldsymbol {\omega }}}

where ν is the kinematic viscosity and 2 {\displaystyle \nabla ^{2}} is the Laplace operator. Under the further assumption of two-dimensional flow, the equation simplifies to:

D ω D t = ν 2 ω {\displaystyle {\frac {D{\boldsymbol {\omega }}}{Dt}}=\nu \nabla ^{2}{\boldsymbol {\omega }}}