Flux
F through a
surface, d
S is the
differential vector area element,
n is the
unit normal to the surface.
Left: No flux passes in the surface, the maximum amount flows normal to the surface.
Right: The reduction in flux passing through a surface can be visualized by reduction in
F or d
S equivalently (resolved into
components, θ is angle to normal
n).
F·d
S is the component of flux passing though the surface, multiplied by the area of the surface (see
dot product). For this reason flux represents physically a flow
per unit area.
In the various subfields of physics, there exist two common usages of the term flux, each with rigorous mathematical frameworks. A simple and ubiquitous concept throughout physics and applied mathematics is the flow of a physical property in space, frequently also with time variation. It is the basis of the field concept in physics and mathematics, with two principal applications: in transport phenomena and surface integrals. The terms "flux", "current", "flux density", "current density", can sometimes be used interchangeably and ambiguously, though the terms used below match those of the contexts in the literature.
Contents

Origin of the term 1

Flux as flow rate per unit area 2

General mathematical definition (transport) 2.1

Transport fluxes 2.2

Quantum mechanics 2.3

Flux as a surface integral 3

General mathematical definition (surface integral) 3.1

Electromagnetism 3.2

Electric flux 3.2.1

Magnetic flux 3.2.2

Poynting flux 3.2.3

See also 4

Notes 5

Further reading 6

External links 7
Origin of the term
The word flux comes from Latin: fluxus means "flow", and fluere is "to flow".^{[1]} As fluxion, this term was introduced into differential calculus by Isaac Newton.
Flux as flow rate per unit area
In transport phenomena (heat transfer, mass transfer and fluid dynamics), flux is defined as the rate of flow of a property per unit area, which has the dimensions [quantity]·[time]^{−1}·[area]^{−1}.^{[2]} For example, the magnitude of a river's current, i.e. the amount of water that flows through a crosssection of the river each second, or the amount of sunlight that lands on a patch of ground each second is also a kind of flux.
General mathematical definition (transport)
In this definition, flux is generally a vector due to the widespread and useful definition of vector area, although there are some cases where only the magnitude is important (like in number fluxes, see below). The frequent symbol is j (or J), and a definition for scalar flux of physical quantity q is the limit:

j = \lim \limits_{A \rightarrow 0}\frac{I}{A}=\frac{dI}{dA}
where:

I = \lim\limits_{\Delta t \rightarrow 0}\frac{\Delta q}{ \Delta t} = \frac{dq}{dt}
is the flow of quantity q per unit time t, and A is the area through which the quantity flows.
For vector flux, the surface integral of j over a surface S, followed by an integral over the time duration t_{1} to t_{2}, gives the total amount of the property flowing through the surface in that time (t_{2} − t_{1}):

q=\int_{t_1}^{t_2}\iint_S \mathbf{j}\cdot\mathbf{\hat{n}}\,{\rm d}A\,{\rm d}t
The area required to calculate the flux is real or imaginary, flat or curved, either as a crosssectional area or a surface. The vector area is a combination of the magnitude of the area through which the mass passes through, A, and a unit vector normal to the area, \mathbf{\hat{n}}. The relation is \mathbf{A} = A \mathbf{\hat{n}}.
If the flux j passes through the area at an angle θ to the area normal \mathbf{\hat{n}}, then

\mathbf{j}\cdot\mathbf{\hat{n}}= j\cos\theta
where · is the dot product of the unit vectors. This is, the component of flux passing through the surface (i.e. normal to it) is j cos θ, while the component of flux passing tangential to the area is j sin θ, but there is no flux actually passing through the area in the tangential direction. The only component of flux passing normal to the area is the cosine component.
One could argue, based on the work of James Clerk Maxwell,^{[3]} that the transport definition precedes the more recent way the term is used in electromagnetism. The specific quote from Maxwell is:
In the case of fluxes, we have to take the integral, over a surface, of the flux through every element of the surface. The result of this operation is called the surface integral of the flux. It represents the quantity which passes through the surface.
—James Clerk Maxwell
Transport fluxes
Eight of the most common forms of flux from the transport phenomena literature are defined as follows:

Momentum flux, the rate of transfer of momentum across a unit area (N·s·m^{−2}·s^{−1}). (Newton's law of viscosity,)^{[4]}

Heat flux, the rate of heat flow across a unit area (J·m^{−2}·s^{−1}). (Fourier's law of conduction)^{[5]} (This definition of heat flux fits Maxwell's original definition.)^{[3]}

Diffusion flux, the rate of movement of molecules across a unit area (mol·m^{−2}·s^{−1}). (Fick's law of diffusion)^{[4]}

Volumetric flux, the rate of volume flow across a unit area (m^{3}·m^{−2}·s^{−1}). (Darcy's law of groundwater flow)

Mass flux, the rate of mass flow across a unit area (kg·m^{−2}·s^{−1}). (Either an alternate form of Fick's law that includes the molecular mass, or an alternate form of Darcy's law that includes the density.)

Radiative flux, the amount of energy transferred in the form of photons at a certain distance from the source per steradian per second (J·m^{−2}·s^{−1}). Used in astronomy to determine the magnitude and spectral class of a star. Also acts as a generalization of heat flux, which is equal to the radiative flux when restricted to the infrared spectrum.

Energy flux, the rate of transfer of energy through a unit area (J·m^{−2}·s^{−1}). The radiative flux and heat flux are specific cases of energy flux.

Particle flux, the rate of transfer of particles through a unit area ([number of particles] m^{−2}·s^{−1})
These fluxes are vectors at each point in space, and have a definite magnitude and direction. Also, one can take the divergence of any of these fluxes to determine the accumulation rate of the quantity in a control volume around a given point in space. For incompressible flow, the divergence of the volume flux is zero.
Chemical diffusion
As mentioned above, chemical molar flux of a component A in an isothermal, isobaric system is defined in Fick's law of diffusion as:

\mathbf{J}_A = D_{AB} \nabla c_A
where the nabla symbol ∇ denotes the gradient operator, D_{AB} is the diffusion coefficient (m^{2}·s^{−1}) of component A diffusing through component B, c_{A} is the concentration (mol/m^{3}) of component A.^{[6]}
This flux has units of mol·m^{−2}·s^{−1}, and fits Maxwell's original definition of flux.^{[3]}
For dilute gases, kinetic molecular theory relates the diffusion coefficient D to the particle density n = N/V, the molecular mass m, the collision cross section \sigma, and the absolute temperature T by

D = \frac{2}{3 n\sigma}\sqrt{\frac{kT}{\pi m}}
where the second factor is the mean free path and the square root (with Boltzmann's constant k) is the mean velocity of the particles.
In turbulent flows, the transport by eddy motion can be expressed as a grossly increased diffusion coefficient.
Quantum mechanics
In quantum mechanics, particles of mass m in the quantum state ψ(r, t) have a probability density defined as

\rho = \psi^* \psi = \psi^2. \,
So the probability of finding a particle in a differential volume element d^{3}r is

{\rm d}P = \psi^2 {\rm d}^3\mathbf{r}. \,
Then the number of particles passing perpendicularly through unit area of a crosssection per unit time is the probability flux;

\mathbf{J} = \frac{i \hbar}{2m} \left(\psi \nabla \psi^*  \psi^* \nabla \psi \right). \,
This is sometimes referred to as the probability current or current density,^{[7]} or probability flux density.^{[8]}
Flux as a surface integral
The flux visualized. The rings show the surface boundaries. The red arrows stand for the flow of charges, fluid particles, subatomic particles, photons, etc. The number of arrows that pass through each ring is the flux.
General mathematical definition (surface integral)
As a mathematical concept, flux is represented by the surface integral of a vector field,^{[9]}

\Phi_F={\scriptstyle A}\mathbf{F} \cdot {\rm d}\mathbf{A}
where F is a vector field, and dA is the vector area of the surface A, directed as the surface normal.
The surface has to be orientable, i.e. two sides can be distinguished: the surface does not fold back onto itself. Also, the surface has to be actually oriented, i.e. we use a convention as to flowing which way is counted positive; flowing backward is then counted negative.
The surface normal is directed usually by the righthand rule.
Conversely, one can consider the flux the more fundamental quantity and call the vector field the flux density.
Often a vector field is drawn by curves (field lines) following the "flow"; the magnitude of the vector field is then the line density, and the flux through a surface is the number of lines. Lines originate from areas of positive divergence (sources) and end at areas of negative divergence (sinks).
See also the image at right: the number of red arrows passing through a unit area is the flux density, the curve encircling the red arrows denotes the boundary of the surface, and the orientation of the arrows with respect to the surface denotes the sign of the inner product of the vector field with the surface normals.
If the surface encloses a 3D region, usually the surface is oriented such that the influx is counted positive; the opposite is the outflux.
The divergence theorem states that the net outflux through a closed surface, in other words the net outflux from a 3D region, is found by adding the local net outflow from each point in the region (which is expressed by the divergence).
If the surface is not closed, it has an oriented curve as boundary. Stokes' theorem states that the flux of the curl of a vector field is the line integral of the vector field over this boundary. This path integral is also called circulation, especially in fluid dynamics. Thus the curl is the circulation density.
We can apply the flux and these theorems to many disciplines in which we see currents, forces, etc., applied through areas.
Electromagnetism
One way to better understand the concept of flux in electromagnetism is by comparing it to a butterfly net. The amount of air moving through the net at any given instant in time is the flux. If the wind speed is high, then the flux through the net is large. If the net is made bigger, then the flux is larger even though the wind speed is the same. For the most air to move through the net, the opening of the net must be facing the direction the wind is blowing. If the net is parallel to the wind, then no wind will be moving through the net. The simplest way to think of flux is "how much air goes through the net", where the air is a velocity field and the net is the boundary of an imaginary surface.
Electric flux
Two forms of electric flux are used, one for the Efield:^{[10]}^{[11]}

\Phi_E={\scriptstyle A}\mathbf{E} \cdot {\rm d}\mathbf{A}
and one for the Dfield (called the electric displacement):

\Phi_D={\scriptstyle A}\mathbf{D} \cdot {\rm d}\mathbf{A}
This quantity arises in Gauss's law – which states that the flux of the electric field E out of a closed surface is proportional to the electric charge Q_{A} enclosed in the surface (independent of how that charge is distributed), the integral form is:

{\scriptstyle A}\mathbf{E} \cdot {\rm d}\mathbf{A} = \frac{Q_A}{\varepsilon_0}
where ε_{0} is the permittivity of free space.
If one considers the flux of the electric field vector, E, for a tube near a point charge in the field the charge but not containing it with sides formed by lines tangent to the field, the flux for the sides is zero and there is an equal and opposite flux at both ends of the tube. This is a consequence of Gauss's Law applied to an inverse square field. The flux for any crosssectional surface of the tube will be the same. The total flux for any surface surrounding a charge q is q/ε_{0}.^{[12]}
In free space the electric displacement is given by the constitutive relation D = ε_{0} E, so for any bounding surface the Dfield flux equals the charge Q_{A} within it. Here the expression "flux of" indicates a mathematical operation and, as can be seen, the result is not necessarily a "flow", since nothing actually flows along electric field lines.
Magnetic flux
The magnetic flux density (magnetic field) having the unit Wb/m^{2} (Tesla) is denoted by B, and magnetic flux is defined analogously:^{[10]}^{[11]}

\Phi_B={\scriptstyle A}\mathbf{B} \cdot {\rm d}\mathbf{A}
with the same notation above. The quantity arises in Faraday's law of induction, in integral form:

\oint_C \mathbf{E} \cdot d \boldsymbol{\ell} = \int_{\partial C} {\partial \mathbf{B}\over \partial t} \cdot {\rm d}\mathbf{s} =  \frac{{\rm d} \Phi_D}{ {\rm d} t}
where dℓ is an infinitesimal vector line element of the closed curve C, with magnitude equal to the length of the infinitesimal line element, and direction given by the tangent to the curve C, with the sign determined by the integration direction.
The timerate of change of the magnetic flux through a loop of wire is minus the electromotive force created in that wire. The direction is such that if current is allowed to pass through the wire, the electromotive force will cause a current which "opposes" the change in magnetic field by itself producing a magnetic field opposite to the change. This is the basis for inductors and many electric generators.
Poynting flux
Using this definition, the flux of the Poynting vector S over a specified surface is the rate at which electromagnetic energy flows through that surface, defined like before:^{[11]}

\Phi_S={\scriptstyle A}\mathbf{S} \cdot {\rm d}\mathbf{A}
The flux of the Poynting vector through a surface is the electromagnetic power, or energy per unit time, passing through that surface. This is commonly used in analysis of electromagnetic radiation, but has application to other electromagnetic systems as well.
Confusingly, the Poynting vector is sometimes called the power flux, which is an example of the first usage of flux, above.^{[13]} It has units of watts per square metre (W/m^{2}).
See also
Notes

^ Weekley, Ernest (1967). An Etymological Dictionary of Modern English. Courier Dover Publications. p. 581.

^

^ ^{a} ^{b} ^{c}

^ ^{a} ^{b} P.M. Whelan, M.J. Hodgeson (1978). Essential Principles of Physics (2nd ed.). John Murray.

^ Carslaw, H.S.; Jaeger, J.C. (1959). Conduction of Heat in Solids (Second ed.). Oxford University Press.

^ Welty; Wicks, Wilson and Rorrer (2001). Fundamentals of Momentum, Heat, and Mass Transfer (4th ed.). Wiley.

^ D. McMahon (2006). Quantum Mechanics Demystified. Demystified. Mc Graw Hill.

^ Sakurai, J. J. (1967). Advanced Quantum Mechanics. Addison Wesley.

^ M.R. Spiegel, S. Lipcshutz, D. Spellman (2009). Vector Analysis. Schaum’s Outlines (2nd ed.). McGraw Hill. p. 100.

^ ^{a} ^{b} I.S. Grant, W.R. Phillips (2008). Electromagnetism. Manchester Physics (2nd ed.). John Wiley & Sons.

^ ^{a} ^{b} ^{c} D.J. Griffiths (2007). Introduction to Electrodynamics (3rd ed.). Pearson Education, Dorling Kindersley.

^ Feynman, Richard P (1964). The Feynman Lectures on Physics II. AddisonWesley. pp. 4–8, 9.

^ Wangsness, Roald K. (1986). Electromagnetic Fields (2nd ed.). Wiley. p.357
Further reading

Stauffer, P.H. (2006). "Flux Flummoxed: A Proposal for Consistent Usage". Ground Water 44 (2): 125–128.
External links

The dictionary definition of at Wiktionary
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