We build optimal exponential bounds for the probabilities of large deviations
of sums \sum_{k=1}^nf(X_k) where (X_k) is a finite reversible Markov chain and
f is an arbitrary bounded function. These bounds depend only on the stationary
mean E_{\pi}f, the end-points of the support of f, the sample size n and the
second largest eigenvalue \lambda of the transition matrix
This paper studies the properties of the Cayley distributions, a new family of models for random p × p rotations. This class of distributions is related to the Cayley transform that maps a p(p − 1)/2 × 1 vector s into SO(p), the space of p × p rotation matrices. First an expression for the uniform measure on SO(p) is derived using the Cayley transform, then the Cayley density for random rotations is investigated. A closed-form expression is derived for its normalizing constant, a simple simulation algorithm is proposed, and moments are derived. The efficiencies of moment estimators of the parameters of the new model are also calculated. A Monte Carlo investigation of tests and of confidence regions for the parameters of the new density is briefly summarized. A numerical example is presented.
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