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Probability Theory III
I︠U︡riĭ Vasilʹevich Prokhorov
其他書名
Stochastic Calculus
出版
Springer Science & Business Media
, 1998
主題
Business & Economics / Finance / General
Computers / Artificial Intelligence / General
Mathematics / Probability & Statistics / General
Mathematics / Probability & Statistics / Stochastic Processes
Technology & Engineering / Electronics / General
Technology & Engineering / Engineering (General)
ISBN
3540546871
9783540546870
URL
http://books.google.com.hk/books?id=3bbTgvGFuDkC&hl=&source=gbs_api
EBook
SAMPLE
註釋
Preface In the axioms of probability theory proposed by Kolmogorov the basic "probabilistic" object is the concept of a probability model or probability space. This is a triple (n, F, P), where n is the space of elementary events or outcomes, F is a a-algebra of subsets of n announced by the events and P is a probability measure or a probability on the measure space (n, F). This generally accepted system of axioms of probability theory proved to be so successful that, apart from its simplicity, it enabled one to embrace the classical branches of probability theory and, at the same time, it paved the way for the development of new chapters in it, in particular, the theory of random (or stochastic) processes. In the theory of random processes, various classes of processes have been studied in depth. Theories of processes with independent increments, Markov processes, stationary processes, among others, have been constructed. In the formation and development of the theory of random processes, a significant event was the realization that the construction of a "general theory of ran dom processes" requires the introduction of a flow of a-algebras (a filtration) F = (Ftk::o supplementing the triple (n, F, P), where F is interpreted as t the collection of events from F observable up to time t.