Journal
COMPUTATIONAL STATISTICS
Volume 22, Issue 1, Pages 145-157Publisher
SPRINGER HEIDELBERG
DOI: 10.1007/s00180-007-0030-7
Keywords
von Mises-Fisher distribution; concentration parameter; modified Bessel function of the first kind; maximum likelihood estimate; successive substitution method
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When analyzing high-dimensional data, it is often appropriate to pay attention only to the direction of each datum, disregarding its norm. The von Mises-Fisher (vMF) distribution is a natural probability distribution for such data. When we estimate the parameters of vMF distributions, parameter kappa which corresponds to the degree of concentration is difficult to obtain, and some approximations are necessary. In this article, we propose an iterative algorithm using fixed points to obtain the maximum likelihood estimate (m.l.e.) for kappa. We prove that there is a unique local maximum for kappa. Besides, using a specific function to calculate the m.l.e., we obtain the upper and lower bounds of the interval in which the exact m.l.e. exists. In addition, based on these bounds, a new and good approximation is derived. The results of numerical experiments demonstrate the new approximation exhibits higher precision than traditional ones.
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