In mathematics, a

function Function or functionality may refer to: Computing * Function key, a type of key on computer keyboards * Function model, a structured representation of processes in a system * Function object or functor or functionoid, a concept of object-oriente ...

defined on an inner product space is said to have rotational invariance if its value does not change when arbitrary rotations are applied to its argument.

Mathematics

Functions

For example, the function :

f(x,y) = x^2 + y^2

is invariant under rotations of the plane around the origin, because for a rotated set of coordinates through any angle ''θ'' :

x' = x \cos \theta  - y \sin \theta

y' = x \sin \theta + y \cos \theta

the function, after some cancellation of terms, takes exactly the same form :

f(x',y') = ^2 + ^2

The rotation of coordinates can be expressed using matrix form using the rotation matrix, :

\begin x' \\ y' \\ \end = \begin \cos \theta & -\sin \theta \\ \sin \theta & \cos \theta \\ \end\begin x \\ y \\ \end.

or symbolically x′ = Rx. Symbolically, the rotation invariance of a real-valued function of two real variables is :

f(\mathbf') = f(\mathbf) = f(\mathbf)

In words, the function of the rotated coordinates takes exactly the same form as it did with the initial coordinates, the only difference is the rotated coordinates replace the initial ones. For a real-valued function of three or more real variables, this expression extends easily using appropriate rotation matrices. The concept also extends to a vector-valued function f of one or more variables; :

\mathbf(\mathbf') = \mathbf(\mathbf) = \mathbf(\mathbf)

In all the above cases, the arguments (here called "coordinates" for concreteness) are rotated, not the function itself.

Operators

For a

f : X \rightarrow X

which maps elements from a subset ''X'' of the real line ℝ to itself, rotational invariance may also mean that the function commutes with rotations of elements in ''X''. This also applies for an operator that acts on such functions. An example is the two-dimensional Laplace operator :

\nabla^2 = \frac + \frac

which acts on a function ''f'' to obtain another function ∇²''f''. This operator is invariant under rotations. If ''g'' is the function ''g''(''p'') = ''f''(''R''(''p'')), where ''R'' is any rotation, then (∇²''g'')(''p'') = (∇²''f'' )(''R''(''p'')); that is, rotating a function merely rotates its Laplacian.

Physics

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 ...

, if a system behaves the same regardless of how it is oriented in space, then its

Lagrangian Lagrangian may refer to: Mathematics * Lagrangian function, used to solve constrained minimization problems in optimization theory; see Lagrange multiplier ** Lagrangian relaxation, the method of approximating a difficult constrained problem with ...

is rotationally invariant. According to

Noether's theorem Noether's theorem or Noether's first theorem states that every differentiable symmetry of the action of a physical system with conservative forces has a corresponding conservation law. The theorem was proven by mathematician Emmy Noether ...

, if the

action Action may refer to: * Action (narrative), a literary mode * Action fiction, a type of genre fiction * Action game, a genre of video game Film * Action film, a genre of film * ''Action'' (1921 film), a film by John Ford * ''Action'' (1980 fil ...

(the integral over time of its Lagrangian) of a physical system is invariant under rotation, then angular momentum is conserved.

Application to quantum mechanics

quantum mechanics Quantum mechanics is a fundamental theory in physics that provides a description of the physical properties of nature at the scale of atoms and subatomic particles. It is the foundation of all quantum physics including quantum chemistr ...

, rotational invariance is the property that after a rotation the new system still obeys Schrödinger's equation. That is :

,E-H = 0

for any rotation ''R''. Since the rotation does not depend explicitly on time, it commutes with the energy operator. Thus for rotational invariance we must have 'R'', ''H''= 0. For

infinitesimal rotation 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 \ ...

s (in the ''xy''-plane for this example; it may be done likewise for any plane) by an angle ''dθ'' the (infinitesimal) rotation operator is :

R = 1 + J_z d\theta \,,

then :

\left + J_z d\theta , \frac \right = 0 \,,

thus :

\frac{dt}J_z = 0\,,

in other words

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 ...

is conserved.

References