Geopotential is the potential of the Earth's gravity field. For convenience it is often defined as the negative of the potential energy per unit mass, so that the gravity vector is obtained as the gradient of the geopotential, without the negation. In addition to the actual potential (the geopotential), a theoretical normal potential and their difference, the disturbing potential, can also be defined.
For geophysical applications, gravity is distinguished from gravitation. Gravity is defined as the resultant force of gravitation and the centrifugal force caused by the Earth's rotation. Likewise, the respective scalar potentials can be added to form an effective potential called the geopotential,
W
The geoid is a gently undulating surface due to the irregular mass distribution inside the Earth; it may be approximated however by an ellipsoid of revolution called the reference ellipsoid. The currently most widely used reference ellipsoid, that of the Geodetic Reference System 1980 (GRS80), approximates the geoid to within a little over ±100 m. One can construct a simple model geopotential
U
U0
W0
T=W-U
Newton's law of universal gravitation states that the gravitational force F acting between two point masses m1 and m2 with centre of mass separation r is given by
F=-G
| m1m2 | |
| r2 |
\hat{r
where G is the gravitational constant and r̂ is the radial unit vector. For a non-pointlike object of continuous mass distribution, each mass element dm can be treated as mass distributed over a small volume, so the volume integral over the extent of object 2 gives:
with corresponding gravitational potential
where ρ = ρ(x, y, z) is the mass density at the volume element and of the direction from the volume element to point mass 1.
u
Earth's gravity field can be derived from a gravity potential (geopotential) field as follows:
g=\nablaW=grad W=
| \partialW | i + | |
| \partialX |
| \partialW | j+ | |
| \partialY |
| \partialW | |
| \partialZ |
k
which expresses the gravity acceleration vector as the gradient of
W
\{i,j,k\}
X,Y,Z
X
Y
Z
Both gravity and its potential contain a contribution from the centrifugal pseudo-force due to the Earth's rotation. We can write
W=V+\Phi
where
V
W
\Phi
The centrifugal force—per unit of mass, i.e., acceleration—is given by
gc=\omega2p,
where
p=Xi+Yj+0 ⋅ k
is the vector pointing to the point considered straight from the Earth's rotational axis. It can be shown that this pseudo-force field, in a reference frame co-rotating with the Earth, has a potential associated with it in terms of Earth's rotation rate, ω:
\Phi=
| 1 | |
| 2 |
\omega2(X2+Y2).
This can be verified by taking the gradient (
\nabla
The centrifugal potential can also be expressed in terms of spherical latitude φ and geocentric radius r:
\Phi=0.5\omega2r2\sin2\phi
The Earth is approximately an ellipsoid.So, it is accurate to approximate the geopotential by a field that has the Earth reference ellipsoid as one of its equipotential surfaces.
Like the actual geopotential field W, the normal field U (not to be confused with the potential energy, also U) is constructed as a two-part sum:
U=\Psi+\Phi
\Psi
\Phi
A closed-form exact expression exists in terms of ellipsoidal-harmonic coordinates (not to be confused with geodetic coordinates).[4] It can also be expressed as a series expansion in terms of spherical coordinates; truncating the series results in:[4]
\Psi ≈ (GM/r)(1-(a/r)2J2((3/2)\cos2(\phi)-1/2))
The most recent Earth reference ellipsoid is GRS80, or Geodetic Reference System 1980, which the Global Positioning system uses as its reference. Its geometric parameters are: semi-major axis a = 6378137.0 m, and flattening f = 1/298.257222101.If we also require that the enclosed mass M is equal to the known mass of the Earth (including atmosphere), as involved in the standard gravitational parameter, GM = 3986005 × 108 m3·s−2, we obtain for the potential at the reference ellipsoid:
U0=62636860.850 rmm2rms-2
Obviously, this value depends on the assumption that the potential goes asymptotically to zero at infinity (
R → infty
Once a clean, smooth geopotential field
U
W
T=W-U
The disturbing potential T is numerically a great deal smaller than U or W, and captures the detailed, complex variations of the true gravity field of the actually existing Earth from point-to-point, as distinguished from the overall global trend captured by the smooth mathematical ellipsoid of the normal potential.
In practical terrestrial work, e.g., levelling, an alternative version of the geopotential is used called geopotential number
C
W0
In the special case of a sphere with a spherically symmetric mass density then ρ = ρ(s); i.e., density depends only on the radial distance
s=\sqrt{x2+y2+z2}.
These integrals can be evaluated analytically. This is the shell theorem saying that in this case:
with corresponding potential
where M = ∫Vρ(s)dxdydz is the total mass of the sphere.
For the purpose of satellite orbital mechanics, the geopotential is typically described by a series expansion into spherical harmonics (spectral representation). In this context the geopotential is taken as the potential of the gravitational field of the Earth, that is, leaving out the centrifugal potential.Solving for geopotential in the simple case of a nonrotating sphere, in units of [m<sup>2</sup>/s<sup>2</sup>] or [J/kg]:[6]
Integrate to getwhere:
. James R. Holton . An Introduction to Dynamic Meteorology . 4th . Burlington . . 2004 . 0-12-354015-1.