XI Symposium on Probability and Stochastic Processes

XI Symposium on Probability and Stochastic Processes
Author: Ramsés H. Mena
Publisher: Birkhäuser
Total Pages: 288
Release: 2015-07-17
Genre: Mathematics
ISBN: 3319139843

This volume features a collection of contributed articles and lecture notes from the XI Symposium on Probability and Stochastic Processes, held at CIMAT Mexico in September 2013. Since the symposium was part of the activities organized in Mexico to celebrate the International Year of Statistics, the program included topics from the interface between statistics and stochastic processes.

XII Symposium of Probability and Stochastic Processes

XII Symposium of Probability and Stochastic Processes
Author: Daniel Hernández-Hernández
Publisher: Springer
Total Pages: 240
Release: 2018-06-26
Genre: Mathematics
ISBN: 3319776436

This volume contains the proceedings of the XII Symposium of Probability and Stochastic Processes which took place at Universidad Autonoma de Yucatan in Merida, Mexico, on November 16–20, 2015. This meeting was the twelfth meeting in a series of ongoing biannual meetings aimed at showcasing the research of Mexican probabilists as well as promote new collaborations between the participants. The book features articles drawn from different research areas in probability and stochastic processes, such as: risk theory, limit theorems, stochastic partial differential equations, random trees, stochastic differential games, stochastic control, and coalescence. Two of the main manuscripts survey recent developments on stochastic control and scaling limits of Markov-branching trees, written by Kazutoshi Yamasaki and Bénédicte Haas, respectively. The research-oriented manuscripts provide new advances in active research fields in Mexico. The wide selection of topics makes the book accessible to advanced graduate students and researchers in probability and stochastic processes.

Proceedings of the Conference Quantum Probability and Infinite Dimensional Analysis

Proceedings of the Conference Quantum Probability and Infinite Dimensional Analysis
Author: Wolfgang Freudenberg
Publisher: World Scientific
Total Pages: 280
Release: 2003
Genre: Science
ISBN: 9812382887

This volume consists of 18 research papers reflecting the impressive progress made in the field. It includes new results on quantum stochastic integration, the stochastic limit, quantum teleportation and other areas. Contents: Markov Property -- Recent Developments on the Quantum Markov Property (L Accardi & F Fidaleo); Stationary Quantum Stochastic Processes from the Cohomological Point of View (G G Amosov); The Feller Property of a Class of Quantum Markov Semigroups II (R Carbone & F Fagnola); Recognition and Teleportation (K-H Fichtner et al.); Prediction Errors and Completely Positive Maps (R Gohm); Multiplicative Properties of Double Stochastic Product Integrals (R L Hudson); Isometric Cocycles Related to Beam Splittings (V Liebscher); Multiplicativity via a Hat Trick (J M Lindsay & S J Wills); Dilation Theory and Continuous Tensor Product Systems of Hilbert Modules (M Skeide); Quasi-Free Fermion Planar Quantum Stochastic Integrals (W J Spring & I F Wilde); and other papers.

High Dimensional Probability

High Dimensional Probability
Author: Ernst Eberlein
Publisher: Birkhäuser
Total Pages: 336
Release: 2012-12-06
Genre: Mathematics
ISBN: 3034888295

What is high dimensional probability? Under this broad name we collect topics with a common philosophy, where the idea of high dimension plays a key role, either in the problem or in the methods by which it is approached. Let us give a specific example that can be immediately understood, that of Gaussian processes. Roughly speaking, before 1970, the Gaussian processes that were studied were indexed by a subset of Euclidean space, mostly with dimension at most three. Assuming some regularity on the covariance, one tried to take advantage of the structure of the index set. Around 1970 it was understood, in particular by Dudley, Feldman, Gross, and Segal that a more abstract and intrinsic point of view was much more fruitful. The index set was no longer considered as a subset of Euclidean space, but simply as a metric space with the metric canonically induced by the process. This shift in perspective subsequently lead to a considerable clarification of many aspects of Gaussian process theory, and also to its applications in other settings.

Quantum Probability And Infinite-dimensional Analysis: Proceedings Of The Conference

Quantum Probability And Infinite-dimensional Analysis: Proceedings Of The Conference
Author: Wolfgang Freudenberg
Publisher: World Scientific
Total Pages: 277
Release: 2003-01-28
Genre: Mathematics
ISBN: 9814486566

This volume consists of 18 research papers reflecting the impressive progress made in the field. It includes new results on quantum stochastic integration, quantum Markov processes, the stochastic limit, quantum teleportation and other areas.