classical mechanics Classical mechanics is a physical theory describing the motion of macroscopic objects, from projectiles to parts of machinery, and astronomical objects, such as spacecraft, planets, stars, and galaxies. For objects governed by classical ...

, Euler's rotation equations are a vectorial quasilinear

first-order ordinary differential equation In mathematics, an ordinary differential equation (ODE) is a differential equation whose unknown(s) consists of one (or more) function(s) of one variable and involves the derivatives of those functions. The term ''ordinary'' is used in contrast ...

describing the rotation of a

rigid body In physics, a rigid body (also known as a rigid object) is a solid body in which deformation is zero or so small it can be neglected. The distance between any two given points on a rigid body remains constant in time regardless of external force ...

, using a

rotating reference frame A rotating frame of reference is a special case of a non-inertial reference frame that is rotating relative to an inertial reference frame. An everyday example of a rotating reference frame is the surface of the Earth. (This article considers onl ...

with

angular velocity In physics, angular velocity or rotational velocity ( or ), also known as angular frequency vector,(UP1) is a pseudovector representation of how fast the angular position or orientation of an object changes with time (i.e. how quickly an objec ...

ω whose axes are fixed to the body. Their general vector form is :

\mathbf \dot + \boldsymbol\omega \times \left( \mathbf \boldsymbol\omega \right) = \mathbf.

where ''M'' is the applied

torque In physics and mechanics, torque is the rotational equivalent of linear force. It is also referred to as the moment of force (also abbreviated to moment). It represents the capability of a force to produce change in the rotational motion of th ...

s and ''I'' is the inertia matrix. The vector

\boldsymbol\alpha=\dot

is the angular acceleration. In

orthogonal In mathematics, orthogonality is the generalization of the geometric notion of ''perpendicularity''. By extension, orthogonality is also used to refer to the separation of specific features of a system. The term also has specialized meanings in ...

principal axes of inertia coordinates the equations become :

\begin
I_1\,\dot_ + (I_3-I_2)\,\omega_2\,\omega_3 &= M_\\
I_2\,\dot_ + (I_1-I_3)\,\omega_3\,\omega_1 &= M_\\
I_3\,\dot_ + (I_2-I_1)\,\omega_1\,\omega_2 &= M_
\end

where ''M_k'' are the components of the applied torques, ''I_k'' are the

principal moments of inertia The moment of inertia, otherwise known as the mass moment of inertia, angular mass, second moment of mass, or most accurately, rotational inertia, of a rigid body is a quantity that determines the torque needed for a desired angular acceler ...

and ω_''k'' are the components of the angular velocity.

Derivation

In an

inertial frame of reference In classical physics and special relativity, an inertial frame of reference (also called inertial reference frame, inertial frame, inertial space, or Galilean reference frame) is a frame of reference that is not undergoing any acceleration. ...

(subscripted "in"), Euler's second law states that the

time derivative A time derivative is a derivative of a function with respect to time, usually interpreted as the rate of change of the value of the function. The variable denoting time is usually written as t. Notation A variety of notations are used to denote th ...

of the

angular momentum In physics, angular momentum (rarely, moment of momentum or rotational momentum) is the rotational analog of linear momentum. It is an important physical quantity because it is a conserved quantity—the total angular momentum of a closed syst ...

L equals the applied

: :

\frac = \mathbf_

For point particles such that the internal forces are

central forces In classical mechanics, a central force on an object is a force (physics), force that is directed towards or away from a point called center of force. : \vec = \mathbf(\mathbf) = \left\vert F( \mathbf ) \right\vert \hat where \vec F is the for ...

, this may be derived using

Newton's second law Newton's laws of motion are three basic laws of classical mechanics that describe the relationship between the motion of an object and the forces acting on it. These laws can be paraphrased as follows: # A body remains at rest, or in motion ...

. For a rigid body, one has the relation between angular momentum and the moment of inertia I_in given as :

\mathbf_ = \mathbf_ \boldsymbol\omega

In the inertial frame, the differential equation is not always helpful in solving for the motion of a general rotating rigid body, as both I_in and ω can change during the motion. One may instead change to a coordinate frame fixed in the rotating body, in which the moment of inertia tensor is constant. Using a reference frame such as that at the center of mass, the frame's position drops out of the equations. In any rotating reference frame, the time derivative must be replaced so that the equation becomes :

\left(\frac\right)_\mathrm + \boldsymbol\omega\times\mathbf = \mathbf

and so the cross product arises, see time derivative in rotating reference frame. The vector components of the torque in the rotating and the inertial frames are related by

\mathbf_ = \mathbf\mathbf,

where Q is the rotation tensor (not

rotation matrix In linear algebra, a rotation matrix is a transformation matrix that is used to perform a rotation in Euclidean space. For example, using the convention below, the matrix :R = \begin \cos \theta & -\sin \theta \\ \sin \theta & \cos \theta \en ...

), an orthogonal tensor related to the angular velocity vector by

\boldsymbol\omega \times \boldsymbol = \dot \mathbf^\boldsymbol

for any vector u. Now

\mathbf = \mathbf \boldsymbol\omega

is substituted and the time derivatives are taken in the rotating frame, while realizing that the particle positions and the inertia tensor does not depend on time. This leads to the general vector form of Euler's equations which are valid in such a frame :

\mathbf \dot + \boldsymbol\omega \times \left( \mathbf \boldsymbol\omega \right) = \mathbf.

The equations are also derived from Newton's laws in the discussion of the resultant torque.

Principal axes form

When choosing a frame so that its axes are aligned with the principal axes of the inertia tensor, its component matrix is diagonal, which further simplifies calculations. As described in the moment of inertia article, the angular momentum L can then be written :

\mathbf = L_\mathbf_ + L_\mathbf_ + L_\mathbf_ = \sum_^3 I_\omega_\mathbf_

Also in some frames not tied to the body can it be possible to obtain such simple (diagonal tensor) equations for the rate of change of the angular momentum. Then ω must be the angular velocity for rotation of that frames axes instead of the rotation of the body. It is however still required that the chosen axes are still principal axes of inertia. The resulting form of the Euler rotation equations is useful for rotation-symmetric objects that allow some of the principal axes of rotation to be chosen freely.

Special case solutions

Torque-free precessions

Torque-free

precession 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 othe ...

s are non-trivial solution for the situation where the torque on the

right hand side In mathematics, LHS is informal shorthand for the left-hand side of an equation. Similarly, RHS is the right-hand side. The two sides have the same value, expressed differently, since equality is symmetric.derivative In mathematics, the derivative of a function of a real variable measures the sensitivity to change of the function value (output value) with respect to a change in its argument (input value). Derivatives are a fundamental tool of calculus. F ...

operator acting on L. In this case I(''t'') and ω(''t'') do change together in such a way that the derivative of their product is still zero. This motion can be visualized by

Poinsot's construction In classical mechanics, Poinsot's construction (after Louis Poinsot) is a geometrical method for visualizing the torque-free motion of a rotating rigid body, that is, the motion of a rigid body on which no external forces are acting. This motion ha ...

References

* C. A. Truesdell, III (1991) ''A First Course in Rational Continuum Mechanics. Vol. 1: General Concepts'', 2nd ed., Academic Press. . Sects. I.8-10. * C. A. Truesdell, III and R. A. Toupin (1960) ''The Classical Field Theories'', in S. Flügge (ed.) ''Encyclopedia of Physics. Vol. III/1: Principles of Classical Mechanics and Field Theory'', Springer-Verlag. Sects. 166–168, 196–197, and 294. * Landau L.D. and Lifshitz E.M. (1976) ''Mechanics'', 3rd. ed., Pergamon Press. (hardcover) and (softcover). * Goldstein H. (1980) ''Classical Mechanics'', 2nd ed., Addison-Wesley. * Symon KR. (1971) ''Mechanics'', 3rd. ed., Addison-Wesley. {{Authority control Rigid bodies Rigid bodies mechanics Rotation in three dimensions Equations de:Eulersche Gleichungen it:Equazioni di Eulero (dinamica)

Derivation

Principal axes form

Special case solutions

Torque-free precessions

See also

References