Averaged deviations of Orlicz processes and majorizing measures
Abstract
This paper is devoted to investigation of supremum of averaged deviations |X(t)-f(t)-∫ T(X(u)-f(u))\, dμ(u)/μ( T)| of a stochastic process from Orlicz space of random variables using the method of majorizing measures. An estimate of distribution of supremum of deviations |X(t)-f(t)| is derived. A special case of the Lq space is considered. As an example, the obtained results are applied to stochastic processes from the L2 space with known covariance functions.
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