Quasi-Banach spaces of random variables and stochastic processes
Abstract
This book develops the theory of quasi-Banach Kσ-spaces F(), F*(), and DV,W() of random variables and stochastic processes, extending the classical framework of Orlicz spaces, Sub() and V(,) spaces. The book consists of eleven chapters. The first two chapters establish the foundational theory: stochastic processes from quasi-Banach Kσ-spaces are introduced, and the fundamental properties of F() are studied in detail. The third chapter derives distribution estimates for suprema of processes from F*(), and the fourth addresses approximation theory in SF(). The fifth chapter examines Orlicz spaces and their connections to F(). Chapters six and seven treat the pre-Banach Kσ-spaces DV,W(), establishing their essential properties and evaluating reliability and accuracy of stochastic process models. The eighth chapter provides norm distribution estimates in Lp(T) for processes from F(). The ninth chapter develops the Monte Carlo method for multiple integrals over Rn with prescribed reliability and accuracy. The final two chapters treat modeling of Sub() processes - subclasses of Kσ-spaces - with given reliability and accuracy in Lp(T) and C(T) respectively. The results are substantially based on the authors' original work and that of their co-authors.
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