Von Mises distribution
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In probability theory and statistics, the von Mises distribution (also known as the circular normal distribution) is a continuous probability distribution. It may be thought of as the circular version of the normal distribution, since it describes the distribution of a random variate with period 2π. It is used in applications of Circular statistics where a distribution of angles are found which are the result of the addition of many small independent angular deviations, such as target sensing, or grain orientation in a granular material. If x is the angular random variable, it is often useful to think of the von Mises distribution as a distribution of complex numbers z=eix rather than the real numbers x. The von Mises distribution is a special case of the von Mises-Fisher distribution on the N-dimensional sphere.
The von Mises probability density function for the angle x is given by:
- [f(x|\mu,\kappa)=\frac}]
The probability density can be expressed as a series of Bessel functions (see Abramowitz and Stegun [§9.6.34])
- [f(x|\mu,\kappa)=]
- [\frac\left(1+\frac\sum_^\infty I_j(\kappa)\cos[j(x!-!mu)]\right)]
- [\Phi(x|\mu,\kappa)=]
- [\int f(t|\mu,\kappa)\,dt=]
- [\frac\left(x+\frac\sum_^\infty I_j(\kappa)\frac\right)]
- [F(x|\mu,\kappa)=\Phi(x|\mu,\kappa)-\Phi(x_0|\mu,\kappa)]
Moments
The moments of the von Mises distribution are usually calculated as the moments of z=eix rather than the angle x itself. These moments are referred to as "circular moments". The variance calculated from these moments is referred to as the "circular variance". The one exception to this is that the "mean" usually refers to the argument of the circular mean, rather than the circular mean itself.
The n-th raw moment of z is:
- [m_n=\langle z^n\rangle=\oint z^n\,f(x|\mu,\kappa)\,dx]
- [= \frace^]
- [I_n(\kappa)=\frac\int_0^\pi e^\cos(nx)\,dx]
- [m_1= \frace^]
- [\textrm(z)=\langle |z|^2\rangle-|\langle z \rangle|^2= 1-\frac]
Limiting behavior
In the limit of large κ the distribution becomes a normal distribution
- [\lim_f(x|\mu,\kappa)=\frac]}}]
- [\lim_f(x|\mu,\kappa)=\mathrm(x)]
References
- Abramowitz, M. and Stegun, I. A. (ed.), Handbook of Mathematical Functions, National Bureau of Standards, 1964; reprinted Dover Publications, 1965. ISBN 0486612724
- “Algorithm AS 86: The von Mises Distribution Function,” Mardia, Applied Statistics, 24, 1975 (pp. 268-272).
- “Algorithm 518, Incomplete Bessel Function I0: The von Mises Distribution,” Hill, ACM Transactions on Mathematical Software, Vol. 3, No. 3, September 1977, Pages 279-284.
- Best, D. and Fisher, N. (1979). Efficient simulation of the von Mises distribution. Applied Statistics, 24, 152–157.
- Evans, M., Hastings, N., and Peacock, B., "von Mises Distribution." Ch. 41 in Statistical Distributions, 3rd ed. New York. Wiley 2000.
- “Statistical Distributions,” 2nd. Edition, Evans, Hastings, and Peacock, John Wiley and Sons, 1993, (chapter 39). ISBN 0471559512
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