Fisher Distribution
A Fisher Distribution is commonly used for modelling the distribution of 3-dimensional orientation vectors [Fisher (1953)], such as the distribution of joint orientations (pole vectors) on a sphere. A Fisher Distribution describes the angular distribution of orientations about a mean orientation vector and is symmetric about the mean. The probability density function can be expressed as:
Eqn.1
Where θ is the angular deviation from the mean vector, in degrees, and K is the "Fisher constant" or dispersion factor.
In RocSlope2, a Fisher distribution can be used to define probabilistic joint orientation or tension crack orientation.
Fisher K
The Fisher K value describes the tightness or dispersion of an orientation cluster. A larger K value (e.g. 50) implies a tighter cluster, and a smaller K value (e.g. 20) implies a more dispersed cluster, as shown in the following figure.
The Fisher K value can be estimated from Eqn. 2, for data sets with greater than approximately 30 vectors (poles) [Fisher (1953)].
Eqn.2
Where N is the number of poles, and R is the magnitude of the resultant vector (i.e. the magnitude of the vector sum of all pole vectors in the set).
Standard Deviation
By analogy with a Normal distribution, it can be shown that the standard deviation of a Fisher distribution can be estimated from Eqn.3 [Butler (1992)].
Eqn.3
Where θ is the "angular standard deviation" or "angular dispersion" of the Fisher Distribution, and K is the Fisher constant.