Precession is a change in the orientation of the rotational axis of a rotating body. In an appropriate reference frame it can be defined as a change in the first Euler angle, whereas the third Euler angle defines the rotation itself. In other words, the axis of rotation of a precessing body itself rotates around another axis. A motion in which the second Euler angle changes is called nutation. In physics, there are two types of precession: torquefree and torqueinduced.
In astronomy, "precession" refers to any of several slow changes in an astronomical body's rotational or orbital parameters, and especially to Earth's precession of the equinoxes. See Astronomy section (below).
Torquefree
In torquefree precession, the angular momentum remains fixed, but the angular velocity vector changes. What makes this possible is a timevarying moment of inertia, or more precisely, a timevarying inertia matrix. The inertia matrix is composed of moments of inertia calculated with respect to separate coordinate axes (e.g. x, y, z), or basis sets. If an object is asymmetric around its principal axis of rotation, the moment of inertia with respect to each basis will change with time, while preserving angular momentum. The result is that the component angular velocities around each axis will vary inversely to each axis' moment of inertia. Poinsot's ellipsoid is a geometrical analog of the functions that govern torquefree motion of a rotating rigid body.
The torquefree precession rate of an object with an axis of symmetry, such as a disk, spinning about an axis not aligned with that axis of symmetry can be calculated as follows:

\boldsymbol\omega_p = \frac{\boldsymbol I_s \boldsymbol\omega_s } {\boldsymbol I_p \cos(\boldsymbol \alpha)}^{[1]}
where \scriptstyle \boldsymbol\omega_p is the precession rate, \scriptstyle \boldsymbol\omega_s is the spin rate about the axis of symmetry, \scriptstyle \boldsymbol I_s is the moment of inertia about the axis of symmetry, \scriptstyle \boldsymbol I_p is moment of inertia about either of the other two equal perpendicular principal axes, and \boldsymbol \alpha is the angle between the moment of inertia direction and the symmetry axis.^{[2]}
When an object is not perfectly solid, internal vortices will tend to damp torquefree precession, and the rotation axis will align itself with one of the inertia axes of the body.
For a generic solid object without any axis of symmetry, the evolution of the object's orientation, represented (for example) by a rotation matrix \scriptstyle \boldsymbol R that transforms internal to external coordinates, may be numerically simulated. Given the object's fixed internal moment of inertia tensor \scriptstyle \boldsymbol I_0 and fixed external angular momentum \scriptstyle \boldsymbol L, the instantaneous angular velocity is \scriptstyle \boldsymbol\omega(\boldsymbol R) \;=\; \boldsymbol R \boldsymbol I_0^{1} \boldsymbol R ^T \boldsymbol L. Precession occurs by repeatedly recalculating \boldsymbol \omega and applying a small rotation vector \scriptstyle \boldsymbol \omega dt for the short time \scriptstyle dt; e.g., \scriptstyle \boldsymbol R_\text{new} \;=\; \exp([\boldsymbol\omega(\boldsymbol R_\text{old})]_{\times} dt) \boldsymbol R_\text{old} for the skewsymmetric matrix \scriptstyle [\boldsymbol\omega]_{\times}. The errors induced by finite time steps tend to increase the rotational kinetic energy, \scriptstyle E(\boldsymbol R) \;=\; \boldsymbol \omega(\boldsymbol R) \cdot \boldsymbol L / 2; this unphysical tendency can be counteracted by repeatedly applying a small rotation vector \scriptstyle \boldsymbol v perpendicular to both \scriptstyle \boldsymbol \omega and \scriptstyle \boldsymbol L, noting that \scriptstyle E(\exp([\boldsymbol v]_{\times}) \boldsymbol R) \;\approx\; E(\boldsymbol R) \,+\, (\boldsymbol \omega(\boldsymbol R) \,\times\, \boldsymbol L) \cdot \boldsymbol v.
Another type of torquefree precession can occur when there are multiple reference frames at work. For example, Earth is subject to local torque induced precession due to the gravity of the sun and moon acting on Earth's axis, but at the same time the solar system is moving around the galactic center. As a consequence, an accurate measurement of Earth's axial reorientation relative to objects outside the frame of the moving galaxy (such as distant quasars commonly used as precession measurement reference points) must account for a minor amount of nonlocal torquefree precession, due to the solar system’s motion.
Torqueinduced
Torqueinduced precession (gyroscopic precession) is the phenomenon in which the axis of a spinning object (e.g.,a gyroscope) describes a cone in space when an external torque is applied to it. The phenomenon is commonly seen in a spinning toy top, but all rotating objects can undergo precession. If the speed of the rotation and the magnitude of the external torque are constant, the spin axis will move at right angles to the direction that would intuitively result from the external torque. In the case of a toy top, its weight is acting downwards from its centre of mass and the normal force (reaction) of the ground is pushing up on it at the point of contact with the support. These two opposite forces produce a torque which causes the top to precess.
The response of a rotating system to an applied torque. When the device swivels, and some roll is added, the wheel tends to pitch.
The device depicted on the right is gimbal mounted. From inside to outside there are three axes of rotation: the hub of the wheel, the gimbal axis, and the vertical pivot.
To distinguish between the two horizontal axes, rotation around the wheel hub will be called spinning, and rotation around the gimbal axis will be called pitching. Rotation around the vertical pivot axis is called rotation.
First, imagine that the entire device is rotating around the (vertical) pivot axis. Then, spinning of the wheel (around the wheelhub) is added. Imagine the gimbal axis to be locked, so that the wheel cannot pitch. The gimbal axis has sensors, that measure whether there is a torque around the gimbal axis.
In the picture, a section of the wheel has been named dm_{1}. At the depicted moment in time, section dm_{1} is at the perimeter of the rotating motion around the (vertical) pivot axis. Section dm_{1}, therefore, has a lot of angular rotating velocity with respect to the rotation around the pivot axis, and as dm_{1} is forced closer to the pivot axis of the rotation (by the wheel spinning further), because of the Coriolis effect, with respect to the vertical pivot axis, dm_{1} tends to move in the direction of the topleft arrow in the diagram (shown at 45°) in the direction of rotation around the pivot axis.^{[3]} Section dm_{2} of the wheel is moving away from the pivot axis, and so a force (again, a Coriolis force) acts in the same direction as in the case of dm_{1}. Note that both arrows point in the same direction.
The same reasoning applies for the bottom half of the wheel, but there the arrows point in the opposite direction to that of the top arrows. Combined over the entire wheel, there is a torque around the gimbal axis when some spinning is added to rotation around a vertical axis.
It is important to note that the torque around the gimbal axis arises without any delay; the response is instantaneous.
In the discussion above, the setup was kept unchanging by preventing pitching around the gimbal axis. In the case of a spinning toy top, when the spinning top starts tilting, gravity exerts a torque. However, instead of rolling over, the spinning top just pitches a little. This pitching motion reorients the spinning top with respect to the torque that is being exerted. The result is that the torque exerted by gravity – via the pitching motion – elicits gyroscopic precession (which in turn yields a counter torque against the gravity torque) rather than causing the spinning top to fall to its side.
Precession or gyroscopic considerations have an effect on bicycle performance at high speed. Precession is also the mechanism behind gyrocompasses.
Classical (Newtonian)
The
torque caused by the normal force –
F_{g} and the weight of the top causes a change in the
angular momentum L in the direction of that torque. This causes the top to precess.
Precession is the result of the angular velocity of rotation and the angular velocity produced by the torque. It is an angular velocity about a line that makes an angle with the permanent rotation axis, and this angle lies in a plane at right angles to the plane of the couple producing the torque. The permanent axis must turn towards this line, because the body cannot continue to rotate about any line that is not a principal axis of maximum moment of inertia; that is, the permanent axis turns in a direction at right angles to that in which the torque might be expected to turn it. If the rotating body is symmetrical and its motion unconstrained, and, if the torque on the spin axis is at right angles to that axis, the axis of precession will be perpendicular to both the spin axis and torque axis.
Under these circumstances the angular velocity of precession is given by:

\boldsymbol\omega_p = \frac{\ mgr}{I_s\boldsymbol\omega_s}
In which I_{s} is the moment of inertia, \scriptstyle \boldsymbol\omega_s is the angular velocity of spin about the spin axis, and m*g and r are the force responsible for the torque and the perpendicular distance of the spin axis about the axis of precession. The torque vector originates at the center of mass. Using \scriptstyle \boldsymbol\omega = \scriptstyle \frac{2\pi}{T}, we find that the period of precession is given by:

T_p = \frac{4\pi^2 I_s}{\ mgrT_s}
In which I_{s} is the moment of inertia, T_{s} is the period of spin about the spin axis, and \scriptstyle \boldsymbol\tau is the torque. In general, the problem is more complicated than this, however.
There is a nonmathematical way of visualizing the cause of gyroscopic precession. The behavior of spinning objects simply obeys the law of inertia by resisting any change in direction. If a force is applied to the object to induce a change in the orientation of the spin axis, the object behaves as if that force was sent 90 degrees ahead, in the direction of rotation. Here is why: A solid object can be thought of as an assembly of individual molecules. If the object is spinning, each molecule's direction of travel constantly changes as that molecule revolves around the object's spin axis. When a force is applied, molecules are forced into a new change of direction at places during their path around the object's axis. This new change in direction is resisted by inertia.
Imagine the object to be a spinning bicycle wheel, held at the axle in the hands of a subject. The wheel is spinning clockwise as seen from a viewer to the subject’s right. Clock positions on the wheel are given relative to this viewer. As the wheel spins, the molecules comprising it are travelling vertically downward the instant they pass the 3o'clock position, horizontally to the left the instant they pass 6 o'clock, vertically upward at 9 o'clock, and horizontally right at 12 o'clock. Between these positions, each molecule travels a combination of these directions, which should be kept in mind as you read ahead. The viewer then applies a force to the wheel at the 3o'clock position directed away from him. The molecules at the 3o'clock position are not being forced to change direction; they still travel vertically downward, unaffected by the force. The same holds for the molecules at 9 o'clock; they are still travelling vertically upward, unaffected by the force that was applied. However, molecules at 6 and 12 o'clock are being "told" to change direction. At 6 o'clock, molecules are forced to veer toward the viewer. At the same time, molecules that are passing 12 o'clock are being forced to veer away from the viewer. The inertia of those molecules resists this change in direction. The result is that they apply an equal and opposite force in response. At 6 o'clock, molecules exert a push directly away from the viewer. Molecules at 12 o'clock push directly toward the viewer. This all happens instantaneously as the force is applied at 3 o'clock. This makes the wheel as a whole tilt toward the viewer. Thus, when the force was applied at 3 o'clock, the wheel behaved as if the force was applied at 6 o'clock—90 degrees ahead in the direction of rotation.
Precession causes another peculiar behavior for spinning objects such as the wheel in this scenario. If the subject holding the wheel removes one hand from the axle, the wheel will remain upright, supported from only one side. However, it will immediately take on an additional motion; it will begin to rotate about a vertical axis, pivoting at the point of support as it continues its axial spin. If the wheel was not spinning, it would topple over and fall if one hand was removed. The initial motion of the wheel beginning to topple over is equivalent to applying a force to it at 12 o'clock in the direction of the unsupported side. When the wheel is spinning, the sudden lack of support at one end of the axle is again equivalent to this force. So instead of toppling over, the wheel behaves as if the force was applied at 3 or 9 o’clock, depending on the direction of spin and which hand was removed. This causes the wheel to begin pivoting at the point of support while remaining upright.
Relativistic
The special and general theories of relativity give three types of corrections to the Newtonian precession, of a gyroscope near a large mass such as Earth, described above. They are:

Thomas precession a special relativistic correction accounting for the observer's being in a rotating noninertial frame.

de Sitter precession a general relativistic correction accounting for the Schwarzschild metric of curved space near a large nonrotating mass.

Lense–Thirring precession a general relativistic correction accounting for the frame dragging by the Kerr metric of curved space near a large rotating mass.
Astronomy
In astronomy, precession refers to any of several gravityinduced, slow and continuous changes in an astronomical body's rotational axis or orbital path. Precession of the equinoxes, perihelion precession, changes in the tilt of Earth's axis to its orbit, and the eccentricity of its orbit over tens of thousands of years are all important parts of the astronomical theory of ice ages.
Axial precession (precession of the equinoxes)
Precessional movement
Precession of the equinox in relation to the distant stars
The path of the north celestial pole among the stars due to the precession. Vega is the bright star near the bottom
Axial precession is the movement of the rotational axis of an astronomical body, whereby the axis slowly traces out a cone. In the case of Earth, this type of precession is also known as the precession of the equinoxes, lunisolar precession, or precession of the equator. Earth goes through one such complete precessional cycle in a period of approximately 26,000 years or 1° every 72 years, during which the positions of stars will slowly change in both equatorial coordinates and ecliptic longitude. Over this cycle, Earth's north axial pole moves from where it is now, within 1° of Polaris, in a circle around the ecliptic pole, with an angular radius of about 23.5 degrees.
Hipparchus is the earliest known astronomer to recognize and assess the precession of the equinoxes at about 1° per century (which is not far from the actual value for antiquity, 1.38°).^{[4]} The precession of Earth's axis was later explained by Newtonian physics. Being an oblate spheroid, Earth has a nonspherical shape, bulging outward at the equator. The gravitational tidal forces of the Moon and Sun apply torque to the equator, attempting to pull the equatorial bulge into the plane of the ecliptic, but instead causing it to precess. The torque exerted by the planets, particularly Jupiter, also plays a role.^{[5]}
Perihelion precession
Planets revolving the Sun follow elliptical (oval) orbits that rotate gradually over time (apsidal precession). The eccentricity of this ellipse and the precession rate of the orbit are exaggerated for visualization. Most orbits in the Solar System have a much smaller eccentricity and precess at a much slower rate, making them nearly circular and stationary.
The orbit of a planet around the Sun is not really an ellipse but a flowerpetal shape because the major axis of each planet's elliptical orbit also precesses within its orbital plane, partly in response to perturbations in the form of the changing gravitational forces exerted by other planets. This is called perihelion precession or apsidal precession.
Discrepancies between the observed perihelion precession rate of the planet Mercury and that predicted by classical mechanics were prominent among the forms of experimental evidence leading to the acceptance of Einstein's Theory of Relativity (in particular, his General Theory of Relativity), which accurately predicted the anomalies.^{[6]}^{[7]}Deviating from Newton's law, Einstein's theory of gravitation predicts an extra term of A/r4, which accurately gives the observed excess turning rate of 43 arcseconds every 100 years.
The gravitational force between the Sun and moon induces the precession in Earth's orbit, which is the major cause of the widely known climate oscillation of Earth that has a period of 19,000 to 23,000 years. It follows that changes in Earth's orbital parameters (e.g. orbital inclination, the angle between Earth's rotation axis and its plane of orbit) is important to the study of Earth's climate, in particular to the study of past ice ages.
See also nodal precession. For precession of the lunar orbit see lunar precession.
See also
References

^ Schaub, Hanspeter (2003), Analytical Mechanics of Space Systems, AIAA, p. 149–150,

^ Boal, David (2001). "Lecture 26 – Torquefree rotation – bodyfixed axes". Retrieved 20080917.

^ Teodorescu, Petre P (2002). Mechanical Systems, Classical Models. Springer. p. 420.

^ DIO 9.1 ‡3

^ Bradt, Hale (2007). Astronomy Methods. Cambridge University Press. p. 66.

^ Max Born (1924), Einstein's Theory of Relativity (The 1962 Dover edition, page 348 lists a table documenting the observed and calculated values for the precession of the perihelion of Mercury, Venus, and Earth.)

^ An even larger value for a precession has been found, for a black hole in orbit around a much more massive black hole, amounting to 39 degrees each orbit.
External links

Explanation and derivation of formula for precession of a top

Precession and the Milankovich theory from educational web site From Stargazers to Starships
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