physics Physics is the natural science that studies matter, its fundamental constituents, its motion and behavior through space and time, and the related entities of energy and force. "Physical science is that department of knowledge which r ...

, a spherical pendulum is a higher dimensional analogue of the

pendulum A pendulum is a weight suspended from a pivot so that it can swing freely. When a pendulum is displaced sideways from its resting, equilibrium position, it is subject to a restoring force due to gravity that will accelerate it back toward th ...

. It consists of a

mass Mass is an intrinsic property of a body. It was traditionally believed to be related to the quantity of matter in a physical body, until the discovery of the atom and particle physics. It was found that different atoms and different eleme ...

moving without

friction Friction is the force resisting the relative motion of solid surfaces, fluid layers, and material elements sliding against each other. There are several types of friction: *Dry friction is a force that opposes the relative lateral motion of ...

on the surface of a

sphere A sphere () is a geometrical object that is a three-dimensional analogue to a two-dimensional circle. A sphere is the set of points that are all at the same distance from a given point in three-dimensional space.. That given point is th ...

. The only forces acting on the mass are the

reaction Reaction may refer to a process or to a response to an action, event, or exposure: Physics and chemistry *Chemical reaction *Nuclear reaction * Reaction (physics), as defined by Newton's third law *Chain reaction (disambiguation). Biology and m ...

from the sphere and

gravity In physics, gravity () is a fundamental interaction which causes mutual attraction between all things with mass or energy. Gravity is, by far, the weakest of the four fundamental interactions, approximately 1038 times weaker than the stro ...

. Owing to the spherical geometry of the problem,

spherical coordinates In mathematics, a spherical coordinate system is a coordinate system for three-dimensional space where the position of a point is specified by three numbers: the ''radial distance'' of that point from a fixed origin, its ''polar angle'' meas ...

are used to describe the position of the mass in terms of , where is fixed such that

r = l

Lagrangian mechanics

Routinely, in order to write down the kinetic

T=\tfracmv^2

and potential

V

parts of the Lagrangian

L=T-V

in arbitrary generalized coordinates the position of the mass is expressed along Cartesian axes. Here, following the conventions shown in the diagram, :

x=l\sin\theta\cos\phi

y=l\sin\theta\sin\phi

z=l(1-\cos\theta)

. Next, time derivatives of these coordinates are taken, to obtain velocities along the axes :

\dot x=l\cos\theta\cos\phi\,\dot\theta-l\sin\theta\sin\phi\,\dot\phi

\dot y=l\cos\theta\sin\phi\,\dot\theta+l\sin\theta\cos\phi\,\dot\phi

\dot z=l\sin\theta\,\dot\theta

. Thus, :

v^2=\dot x ^2+\dot y ^2+\dot z ^2
=l^2\left(\dot\theta ^2+\sin^2\theta\,\dot\phi ^2\right)

and :

T=\tfracmv^2
=\tfracml^2\left(\dot\theta ^2+\sin^2\theta\,\dot\phi ^2\right)

V=mg\,z=mg\,l(1-\cos\theta)

The Lagrangian, with constant parts removed, is :

L=\frac
ml^2\left(
  \dot^2+\sin^2\theta\ \dot^2
\right)
+ mgl\cos\theta.

The

Euler–Lagrange equation In the calculus of variations and classical mechanics, the Euler–Lagrange equations are a system of second-order ordinary differential equations whose solutions are stationary points of the given action functional. The equations were discovered ...

involving the polar angle

\theta

\frac\fracL-\fracL=0

gives :

\frac
\left(ml^2\dot
\right)
-ml^2\sin\theta\cdot\cos\theta\,\dot^2+
mgl\sin\theta =0

and :

\ddot\theta=\sin\theta\cos\theta\dot\phi ^2-\frac\sin\theta

When

\dot\phi=0

the equation reduces to the

differential equation In mathematics, a differential equation is an equation that relates one or more unknown functions and their derivatives. In applications, the functions generally represent physical quantities, the derivatives represent their rates of change, an ...

for the motion of a

simple gravity pendulum A pendulum is a weight suspended from a pivot so that it can swing freely. When a pendulum is displaced sideways from its resting, equilibrium position, it is subject to a restoring force due to gravity that will accelerate it back toward the ...

. Similarly, the Euler–Lagrange equation involving the azimuth

\phi

, :

\frac\fracL-\fracL=0

gives :

\frac
\left(
  ml^2\sin^2\theta
  \cdot 
  \dot
\right)
=0

. The last equation shows that

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 ...

around the vertical axis,

, \mathbf L_z,  = l\sin\theta \times ml\sin\theta\,\dot\phi

is conserved. The factor

ml^2\sin^2\theta

will play a role in the Hamiltonian formulation below. The second order differential equation determining the evolution of

\phi

is thus :

\ddot\phi\,\sin\theta = -2\,\dot\theta\,\dot\,\cos\theta

. The azimuth

\phi

, being absent from the Lagrangian, is a

cyclic coordinate In physics, Lagrangian mechanics is a formulation of classical mechanics founded on the stationary-action principle (also known as the principle of least action). It was introduced by the Italian-French mathematician and astronomer Joseph-Lou ...

, which implies that its

conjugate momentum In mathematics and classical mechanics, canonical coordinates are sets of coordinates on phase space which can be used to describe a physical system at any given point in time. Canonical coordinates are used in the Hamiltonian formulation of ...

is a constant of motion. The

conical pendulum A conical pendulum consists of a weight (or bob) fixed on the end of a string or rod suspended from a pivot. Its construction is similar to an ordinary pendulum; however, instead of swinging back and forth, the bob of a conical pendulum moves at ...

refers to the special solutions where

\dot\theta=0

and

\dot\phi

is a constant not depending on time.

Hamiltonian mechanics

The Hamiltonian is :

H=P_\theta\dot \theta + P_\phi\dot \phi-L

where conjugate momenta are :

P_\theta=\frac=ml^2\cdot \dot \theta

and :

P_\phi=\frac = ml^2 \sin^2\! \theta \cdot \dot \phi

. In terms of coordinates and momenta it reads

H = \underbrace_ + \underbrace_=
+-mgl\cos\theta

Hamilton's equations will give time evolution of coordinates and momenta in four first-order differential equations :

\dot =

\dot =

\dot =\cos\theta-mgl\sin\theta

\dot =0

Momentum

P_\phi

is a constant of motion. That is a consequence of the rotational symmetry of the system around the vertical axis.

Trajectory

Trajectory of the mass on the sphere can be obtained from the expression for the total energy :

E=\underbrace_+\underbrace_

by noting that the horizontal component of angular momentum

L_z = ml^2\sin^2\!\theta \,\dot\phi

is a constant of motion, independent of time. This is true because neither gravity nor the reaction from the sphere act in directions that would affect this component of angular momentum. Hence :

E=\fracml^2\dot\theta^2 + \frac\frac-mgl\cos\theta

\left(\frac\right)^2=\frac\left -\frac\frac+mgl\cos\theta\right /math>

which leads to an

elliptic integral In integral calculus, an elliptic integral is one of a number of related functions defined as the value of certain integrals, which were first studied by Giulio Fagnano and Leonhard Euler (). Their name originates from their originally arising in ...

of the first kind for

\theta

\,d\theta

and an elliptic integral of the third kind for

\phi

\,d\theta

. The angle

\theta

lies between two circles of latitude, where :

E>\frac\frac-mgl\cos\theta

Lagrangian mechanics

Hamiltonian mechanics

Trajectory

See also

References

Further reading