In fluid dynamics, potential flow describes the velocity field as the gradient of a scalar function: the velocity potential. As a result, a potential flow is characterized by an irrotational velocity field, which is a valid approximation for several applications. The irrotationality of a potential flow is due to the curl of a gradient always being equal to zero.
In the case of an incompressible flow the velocity potential satisfies Laplace's equation, and potential theory is applicable. However, potential flows also have been used to describe compressible flows. The potential flow approach occurs in the modeling of both stationary as well as nonstationary flows.
Applications of potential flow are for instance: the outer flow field for aerofoils, water waves, electroosmotic flow, and groundwater flow. For flows (or parts thereof) with strong vorticity effects, the potential flow approximation is not applicable.
- 1 Characteristics and applications
- 2 Analysis for two-dimensional flow
- 3 Examples of Two-dimensional potential flows
- 4 See also
- 5 Notes
- 6 References
- 7 Further reading
- 8 External links
Characteristics and applications
Description and characteristics
In fluid dynamics, a potential flow is described by means of a velocity potential φ, being a function of space and time. The flow velocity v is a vector field equal to the gradient, ∇, of the velocity potential φ:
Sometimes, also the definition v = −∇φ, with a minus sign, is used. But here we will use the definition above, without the minus sign. From vector calculus it is known, that the curl of a gradient is equal to zero:
This implies that a potential flow is an irrotational flow. This has direct consequences for the applicability of potential flow. In flow regions where vorticity is known to be important, such as wakes and boundary layers, potential flow theory is not able to provide reasonable predictions of the flow. Fortunately, there are often large regions of a flow where the assumption of irrotationality is valid, which is why potential flow is used for various applications. For instance in: flow around aircraft, groundwater flow, acoustics, water waves, and electroosmotic flow.
where ∇2 = ∇ ⋅ ∇ is the Laplace operator (sometimes also written Δ). In this case the flow can be determined completely from its kinematics: the assumptions of irrotationality and zero divergence of the flow. Dynamics only have to be applied afterwards, if one is interested in computing pressures: for instance for flow around airfoils through the use of Bernoulli's principle.
In two dimensions, potential flow reduces to a very simple system that is analyzed using complex analysis (see below).
with Mach number components
where a is the local speed of sound. The flow velocity v is again equal to ∇Φ, with Φ the velocity potential. The full potential equation is valid for sub-, trans- and supersonic flow at arbitrary angle of attack, as long as the assumption of irrotationality is applicable.
In case of either subsonic or supersonic (but not transonic or hypersonic) flow, at small angles of attack and thin bodies, an additional assumption can be made: the velocity potential is split into an undisturbed onflow velocity V∞ in the x-direction, and a small perturbation velocity ∇φ thereof. So:
In that case, the linearized small-perturbation potential equation — an approximation to the full potential equation — can be used:
with M∞ = V∞ /a∞ the Mach number of the incoming free stream. This linear equation is much easier to solve than the full potential equation: it may be recast into Laplace's equation by a simple coordinate stretching in the x-direction.
|Derivation of the full potential equation|
|For a steady inviscid flow, the Euler equations — for the mass and momentum density — are, in subscript notation and in non-conservation form:
while using the summation convention: since j occurs more than once in the term on the left hand side of the momentum equation, j is summed over all its components (which is from j=1 to 2 in two-dimensional flow, and from j=1 to 3 in three dimensions). Further:
As a result, the flow equations can be written as:
Multiplying (and summing) the momentum equation with vi, and using the mass equation to eliminate the density gradient gives:
When divided by ρ, and with all terms on one side of the equation, the compressible flow equation is:
Note that until this stage, no assumptions have been made regarding the flow (besides that it is a steady flow).
Now, for irrotational flow the velocity v is the gradient of the velocity potential Φ, and the local Mach number components Mi are defined as:
When used in the flow equation, the full potential equation results:
Written out in components, the form given at the beginning of this section is obtained. When a specific equation of state is provided, relating pressure p and density ρ, the speed of sound can be determined. Subsequently, together with adequate boundary conditions, the full potential equation can be solved (most often through the use of a computational fluid dynamics code).
Small-amplitude sound waves can be approximated with the following potential-flow model:
which is a linear wave equation for the velocity potential φ. Again the oscillatory part of the velocity vector v is related to the velocity potential by v = ∇φ, while as before Δ is the Laplace operator, and ā is the average speed of sound in the homogeneous medium. Note that also the oscillatory parts of the pressure p and density ρ each individually satisfy the wave equation, in this approximation.
Applicability and limitations
Potential flow does not include all the characteristics of flows that are encountered in the real world. Potential flow theory cannot be applied for viscous internal flows. Richard Feynman considered potential flow to be so unphysical that the only fluid to obey the assumptions was "dry water" (quoting John von Neumann).
Incompressible potential flow also makes a number of invalid predictions, such as d'Alembert's paradox, which states that the drag on any object moving through an infinite fluid otherwise at rest is zero.
Nevertheless, understanding potential flow is important in many branches of fluid mechanics. In particular, simple potential flows (called elementary flows) such as the free vortex and the point source possess ready analytical solutions. These solutions can be superposed to create more complex flows satisfying a variety of boundary conditions. These flows correspond closely to real-life flows over the whole of fluid mechanics; in addition, many valuable insights arise when considering the deviation (often slight) between an observed flow and the corresponding potential flow.
Potential flow finds many applications in fields such as aircraft design. For instance, in computational fluid dynamics, one technique is to couple a potential flow solution outside the boundary layer to a solution of the boundary layer equations inside the boundary layer.
The absence of boundary layer effects means that any streamline can be replaced by a solid boundary with no change in the flow field, a technique used in many aerodynamic design approaches. Another technique would be the use of Riabouchinsky solids.[dubious ]
Analysis for two-dimensional flow
Potential flow in two dimensions is simple to analyze using conformal mapping, by the use of transformations of the complex plane. However, use of complex numbers is not required, as for example in the classical analysis of fluid flow past a cylinder. It is not possible to solve a potential flow using complex numbers in three dimensions.
The basic idea is to use a holomorphic (also called analytic) or meromorphic function f , which maps the physical domain (x, y) to the transformed domain (φ, ψ). While x, y, φ and ψ are all real valued, it is convenient to define the complex quantities
Now, if we write the mapping f as
The velocity components (u, v), in the (x, y) directions respectively, can be obtained directly from f by differentiating with respect to z. That is
So the velocity field v = (u, v) is specified by
So φ can be identified as the velocity potential and ψ is called the stream function. Lines of constant ψ are known as streamlines and lines of constant φ are known as equipotential lines (see equipotential surface).
Streamlines and equipotential lines are orthogonal to each other, since
Thus the flow occurs along the lines of constant ψ and at right angles to the lines of constant φ.
It is interesting to note that Δψ = 0 is also satisfied, this relation being equivalent to ∇ × v = 0. So the flow is irrotational. The automatic condition ∂2Ψ/ = ∂2Ψ/ then gives the incompressibility constraint ∇ · v = 0.
Examples of Two-dimensional potential flows
|Examples of conformal maps for the power law w = Azn, for different values of the power n. Shown is the z-plane, showing lines of constant potential φ and streamfunction ψ, while w = φ + iψ.|
then, writing z in polar coordinates as z = x + iy = reiθ, we have
In the figures to the right examples are given for several values of n. The black line is the boundary of the flow, while the darker blue lines are streamlines, and the lighter blue lines are equi-potential lines. Some interesting powers n are:
- n = 1/: this corresponds with flow around a semi-infinite plate,
- n = 2/: flow around a right corner,
- n = 1 : a trivial case of uniform flow,
- n = 2 : flow through a corner, or near a stagnation point, and
- n = −1 : flow due to a source doublet
Power laws with n = 1: uniform flow
If w = Az1, that is, a power law with n = 1, the streamlines (i.e. lines of constant ψ) are a system of straight lines parallel to the x-axis. This is easiest to see by writing in terms of real and imaginary components:
thus giving φ = Ax and ψ = Ay. This flow may be interpreted as uniform flow parallel to the x-axis.
Power laws with n = 2
If n = 2, then w = Az2 and the streamline corresponding to a particular value of ψ are those points satisfying
which is a system of rectangular hyperbolae. This may be seen by again rewriting in terms of real and imaginary components. Noting that and rewriting and it is seen (on simplifying) that the streamlines are given by
The velocity field is given by ∇φ, or
In fluid dynamics, the flowfield near the origin corresponds to a stagnation point. Note that the fluid at the origin is at rest (this follows on differentiation of f (z) = z2 at z = 0).
The ψ = 0 streamline is particularly interesting: it has two (or four) branches, following the coordinate axes, i.e. x = 0 and y = 0.
As no fluid flows across the x-axis, it (the x-axis) may be treated as a solid boundary. It is thus possible to ignore the flow in the lower half-plane where y < 0 and to focus on the flow in the upper half-plane.
With this interpretation, the flow is that of a vertically directed jet impinging on a horizontal flat plate.
The flow may also be interpreted as flow into a 90 degree corner if the regions specified by (say) x, y < 0 are ignored.
Power laws with n = 3
If n = 3, the resulting flow is a sort of hexagonal version of the n = 2 case considered above. Streamlines are given by, ψ = 3x2y − y3 and the flow in this case may be interpreted as flow into a 60 degree corner.
Power laws with n = −1: doublet
If n = −1, the streamlines are given by
This is more easily interpreted in terms of real and imaginary components:
Thus the streamlines are circles that are tangent to the x-axis at the origin. The circles in the upper half-plane thus flow clockwise, those in the lower half-plane flow anticlockwise. Note that the velocity components are proportional to r−2; and their values at the origin is infinite. This flow pattern is usually referred to as a doublet and can be interpreted as the combination of source-sink pair of infinite strength kept at an infinitesimally small distance apart.
The velocity field is given by
or in polar coordinates:
Power laws with n = −2: quadrupole
If n = −2, the streamlines are given by
- Aerodynamic potential-flow code
- Conformal mapping
- Darwin drift
- Laplacian field
- Stream function
- Velocity potential
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