rot2quat

<p>It returns an unsigned unite quaternion in \(S^3\) (the four-dimensional sphere) from a \(3 \times 3\) 
rotation matrix on SO(3).</p>

Converting a rotation matrix on SO(3) to an unsigned unit quaternion

A collection of functions for directional data (including massive, with millions of observations, data) analysis. Hypothesis testing, discriminant and regression analysis, MLE of distributions and more are included. The standard textbook for such data is the "Directional Statistics" by Mardia, K. V. and Jupp, P. E. (2000). Other references include  Phillip J. Paine, Simon P. Preston Michail Tsagris and Andrew T. A. Wood (2018). An elliptically symmetric angular Gaussian distribution. Statistics and Computing 28(3): 689-697. <doi:10.1007/s11222-017-9756-4>, P. J. Paine, S. P. Preston, M. Tsagris and Andrew T. A. Wood (2019). Spherical regression models with general covariates and anisotropic errors. Statistics and Computing (to appear). <doi:10.1007/s11222-019-09872-2>.

Converting a rotation matrix on SO(3) to an unsigned unit quaternion: Converting a rotation matrix on SO(3) to an unsigned unit quaternion

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Examples