probability theory Probability theory or probability calculus is the branch of mathematics concerned with probability. Although there are several different probability interpretations, probability theory treats the concept in a rigorous mathematical manner by expre ...

and

directional statistics Directional statistics (also circular statistics or spherical statistics) is the subdiscipline of statistics that deals with directions (unit vectors in Euclidean space, R''n''), axes ( lines through the origin in R''n'') or rotations in R''n''. ...

, a wrapped normal distribution is a wrapped probability distribution that results from the "wrapping" of the

normal distribution In probability theory and statistics, a normal distribution or Gaussian distribution is a type of continuous probability distribution for a real-valued random variable. The general form of its probability density function is f(x) = \frac ...

around the

unit circle In mathematics, a unit circle is a circle of unit radius—that is, a radius of 1. Frequently, especially in trigonometry, the unit circle is the circle of radius 1 centered at the origin (0, 0) in the Cartesian coordinate system in the Eucli ...

. It finds application in the theory of

Brownian motion Brownian motion is the random motion of particles suspended in a medium (a liquid or a gas). The traditional mathematical formulation of Brownian motion is that of the Wiener process, which is often called Brownian motion, even in mathematical ...

and is a solution to the

heat equation In mathematics and physics (more specifically thermodynamics), the heat equation is a parabolic partial differential equation. The theory of the heat equation was first developed by Joseph Fourier in 1822 for the purpose of modeling how a quanti ...

for

periodic boundary conditions Periodic boundary conditions (PBCs) are a set of boundary conditions which are often chosen for approximating a large (infinite) system by using a small part called a ''unit cell''. PBCs are often used in computer simulations and mathematical mod ...

. It is closely approximated by the

von Mises distribution In probability theory and directional statistics, the Richard von Mises, von Mises distribution (also known as the circular normal distribution or the Andrey Nikolayevich Tikhonov, Tikhonov distribution) is a continuous probability distribution ...

, which, due to its mathematical simplicity and tractability, is the most commonly used distribution in directional statistics.

Definition

The

probability density function In probability theory, a probability density function (PDF), density function, or density of an absolutely continuous random variable, is a Function (mathematics), function whose value at any given sample (or point) in the sample space (the s ...

of the wrapped normal distribution is :

f_(\theta;\mu,\sigma)=\frac \sum^_ \exp \left frac \right

where ''μ'' and ''σ'' are the mean and standard deviation of the unwrapped distribution, respectively. Expressing the above density function in terms of the

characteristic function In mathematics, the term "characteristic function" can refer to any of several distinct concepts: * The indicator function of a subset, that is the function \mathbf_A\colon X \to \, which for a given subset ''A'' of ''X'', has value 1 at points ...

of the normal distribution yields: :

f_(\theta;\mu,\sigma)=\frac\sum_^\infty e^ =\frac\vartheta\left(\frac,\frac\right) ,

where

\vartheta(\theta,\tau)

is the

Jacobi theta function In mathematics, theta functions are special functions of several complex variables. They show up in many topics, including Abelian varieties, moduli spaces, quadratic forms, and solitons. Theta functions are parametrized by points in a tube do ...

, given by :

\vartheta(\theta,\tau)=\sum_^\infty (w^2)^n q^
 \text w \equiv e^

and

q \equiv e^ .

The wrapped normal distribution may also be expressed in terms of the

Jacobi triple product In mathematics, the Jacobi triple product is the identity: :\prod_^\infty \left( 1 - x^\right) \left( 1 + x^ y^2\right) \left( 1 +\frac\right) = \sum_^\infty x^ y^, for complex numbers ''x'' and ''y'', with , ''x'', < 1 and ''y'' ≠ 0. It ...

: :

f_(\theta;\mu,\sigma)=\frac\prod_^\infty (1-q^n)(1+q^z)(1+q^/z) .

where

z=e^\,

and

q=e^.

Moments

In terms of the circular variable

z=e^

the circular moments of the wrapped normal distribution are the characteristic function of the normal distribution evaluated at integer arguments: :

\langle z^n\rangle=\int_\Gamma e^\,f_(\theta;\mu,\sigma)\,d\theta = e^.

where

\Gamma\,

is some interval of length

2\pi

. The first moment is then the average value of ''z'', also known as the mean resultant, or mean resultant vector: :

\langle z \rangle=e^

The mean angle is :

\theta_\mu=\mathrm\langle z \rangle = \mu

and the length of the mean resultant is :

R=, \langle z \rangle,  = e^

The circular standard deviation, which is a useful measure of dispersion for the wrapped normal distribution and its close relative, the

is given by: :

s=\ln(R^)^ = \sigma

Estimation of parameters

A series of ''N'' measurements ''z''_''n'' = ''e''^{''iθ''_''n''} drawn from a wrapped normal distribution may be used to estimate certain parameters of the distribution. The average of the series is defined as :

\overline=\frac\sum_^N z_n

and its expectation value will be just the first moment: :

\langle\overline\rangle=e^. \,

In other words, is an unbiased estimator of the first moment. If we assume that the mean ''μ'' lies in the interval

information entropy In information theory, the entropy of a random variable quantifies the average level of uncertainty or information associated with the variable's potential states or possible outcomes. This measures the expected amount of information needed ...

of the wrapped normal distribution is defined as: :

H = -\int_\Gamma f_(\theta;\mu,\sigma)\,\ln(f_(\theta;\mu,\sigma))\,d\theta

where

\Gamma

is any interval of length

2\pi

. Defining

z=e^

and

q=e^

, the

representation for the wrapped normal is: :

f_(\theta;\mu,\sigma) = \frac\prod_^\infty (1+q^z)(1+q^z^)

where

\phi(q)\,

is the Euler function. The logarithm of the density of the wrapped normal distribution may be written: :

\ln(f_(\theta;\mu,\sigma))=  \ln\left(\frac\right)+\sum_^\infty\ln(1+q^z)+\sum_^\infty\ln(1+q^z^)

Using the series expansion for the logarithm: :

\ln(1+x)=-\sum_^\infty \frac\,x^k

the logarithmic sums may be written as: :

\sum_^\infty\ln(1+q^z^)=-\sum_^\infty \sum_^\infty \frac\,q^z^ = -\sum_^\infty \frac\,\frac\,z^

so that the logarithm of density of the wrapped normal distribution may be written as: :

\ln(f_(\theta;\mu,\sigma))=\ln\left(\frac\right)-\sum_^\infty \frac \frac\,(z^k+z^)

which is essentially a

Fourier series A Fourier series () is an Series expansion, expansion of a periodic function into a sum of trigonometric functions. The Fourier series is an example of a trigonometric series. By expressing a function as a sum of sines and cosines, many problems ...

\theta\,

. Using the characteristic function representation for the wrapped normal distribution in the left side of the integral: :

f_(\theta;\mu,\sigma) =\frac\sum_^\infty q^\,z^n

the entropy may be written: :

H = -\ln\left(\frac\right)+\frac\int_\Gamma \left( \sum_^\infty\sum_^\infty \frac \frac\left(z^+z^\right) \right)\,d\theta

which may be integrated to yield: :

H = -\ln\left(\frac\right)+2\sum_^\infty \frac\, \frac

References

* * *

External links

Circular Values Math and Statistics with C++11
A C++11 infrastructure for circular values (angles, time-of-day, etc.) mathematics and statistics {{ProbDistributions, directional Continuous distributions Directional statistics Normal distribution

Definition

Moments

Estimation of parameters

See also

References

External links