Bingham distribution

In statistics, the Bingham distribution, named after Christopher Bingham, is an antipodally symmetric probability distribution on the n-sphere.^[1] It is a generalization of the Watson distribution and a special case of the Kent and Fisher–Bingham distributions.

The Bingham distribution is widely used in paleomagnetic data analysis,^[2] and has been used in the field of computer vision.^[3][4][5]

Its probability density function is given by

${\displaystyle f(\mathbf{𝐱};M,Z)d{S}^{n-1}={}_1{F}_1{(\frac{1}{2};\frac{n}{2};Z)}^{-1}\cdot \exp (\mathrm{tr}Z{M}^T\mathbf{𝐱}{\mathbf{𝐱}}^{T}M)d{S}^{n-1}}$

which may also be written

${\displaystyle f(\mathbf{𝐱};M,Z)d{S}^{n-1}={}_1{F}_1{(\frac{1}{2};\frac{n}{2};Z)}^{-1}\cdot \exp \left({\mathbf{𝐱}}^{T}MZ{M}^T\mathbf{𝐱}\right)d{S}^{n-1}}$

where x is an axis (i.e., a unit vector), M is an orthogonal orientation matrix, Z is a diagonal concentration matrix, and ${\displaystyle {}_1{F}_1(\cdot ;\cdot ,\cdot )}$ is a confluent hypergeometric function of matrix argument. The matrices M and Z are the result of diagonalizing the positive-definite covariance matrix of the Gaussian distribution that underlies the Bingham distribution.

• Directional statistics
• von Mises–Fisher distribution
• Kent distribution

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