White Noise on Bialgebras [electronic resource] /
Stochastic processes with independent increments on a group are generalized to the concept of "white noise" on a Hopf algebra or bialgebra. The main purpose of the book is the characterization of these processes as solutions of quantum stochastic differential equations in the sense of R.L. Hudsonand K.R. Parthasarathy. The notes are a contribution to quantum probability but they are also related to classical probability, quantum groups, and operator algebras. The Az ma martingales appear as examples of white noise on a Hopf algebra which is a deformation of the Heisenberg group. The book will be of interest to probabilists and quantum probabilists. Specialists in algebraic structures who are curious about the role of their concepts in probablility theory as well as quantum theory may find the book interesting. The reader should havesome knowledge of functional analysis, operator algebras, and probability theory.
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Format: | Texto biblioteca |
Language: | eng |
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Berlin, Heidelberg : Springer Berlin Heidelberg : Imprint: Springer,
1993
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Subjects: | Mathematics., Algebra., Mathematical analysis., Analysis (Mathematics)., Probabilities., Physics., Probability Theory and Stochastic Processes., Analysis., Theoretical, Mathematical and Computational Physics., |
Online Access: | http://dx.doi.org/10.1007/BFb0089237 |
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KOHA-OAI-TEST:1980892018-07-30T23:24:13ZWhite Noise on Bialgebras [electronic resource] / Schürmann, Michael. author. SpringerLink (Online service) textBerlin, Heidelberg : Springer Berlin Heidelberg : Imprint: Springer,1993.engStochastic processes with independent increments on a group are generalized to the concept of "white noise" on a Hopf algebra or bialgebra. The main purpose of the book is the characterization of these processes as solutions of quantum stochastic differential equations in the sense of R.L. Hudsonand K.R. Parthasarathy. The notes are a contribution to quantum probability but they are also related to classical probability, quantum groups, and operator algebras. The Az ma martingales appear as examples of white noise on a Hopf algebra which is a deformation of the Heisenberg group. The book will be of interest to probabilists and quantum probabilists. Specialists in algebraic structures who are curious about the role of their concepts in probablility theory as well as quantum theory may find the book interesting. The reader should havesome knowledge of functional analysis, operator algebras, and probability theory.Basic concepts and first results -- Symmetric white noise on Bose Fock space -- Symmetrization -- White noise on bose fock space -- Quadratic components of conditionally positive linear functionals -- Limit theorems.Stochastic processes with independent increments on a group are generalized to the concept of "white noise" on a Hopf algebra or bialgebra. The main purpose of the book is the characterization of these processes as solutions of quantum stochastic differential equations in the sense of R.L. Hudsonand K.R. Parthasarathy. The notes are a contribution to quantum probability but they are also related to classical probability, quantum groups, and operator algebras. The Az ma martingales appear as examples of white noise on a Hopf algebra which is a deformation of the Heisenberg group. The book will be of interest to probabilists and quantum probabilists. Specialists in algebraic structures who are curious about the role of their concepts in probablility theory as well as quantum theory may find the book interesting. The reader should havesome knowledge of functional analysis, operator algebras, and probability theory.Mathematics.Algebra.Mathematical analysis.Analysis (Mathematics).Probabilities.Physics.Mathematics.Probability Theory and Stochastic Processes.Analysis.Theoretical, Mathematical and Computational Physics.Algebra.Springer eBookshttp://dx.doi.org/10.1007/BFb0089237URN:ISBN:9783540476146 |
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Mathematics. Algebra. Mathematical analysis. Analysis (Mathematics). Probabilities. Physics. Mathematics. Probability Theory and Stochastic Processes. Analysis. Theoretical, Mathematical and Computational Physics. Algebra. Mathematics. Algebra. Mathematical analysis. Analysis (Mathematics). Probabilities. Physics. Mathematics. Probability Theory and Stochastic Processes. Analysis. Theoretical, Mathematical and Computational Physics. Algebra. |
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Mathematics. Algebra. Mathematical analysis. Analysis (Mathematics). Probabilities. Physics. Mathematics. Probability Theory and Stochastic Processes. Analysis. Theoretical, Mathematical and Computational Physics. Algebra. Mathematics. Algebra. Mathematical analysis. Analysis (Mathematics). Probabilities. Physics. Mathematics. Probability Theory and Stochastic Processes. Analysis. Theoretical, Mathematical and Computational Physics. Algebra. Schürmann, Michael. author. SpringerLink (Online service) White Noise on Bialgebras [electronic resource] / |
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Stochastic processes with independent increments on a group are generalized to the concept of "white noise" on a Hopf algebra or bialgebra. The main purpose of the book is the characterization of these processes as solutions of quantum stochastic differential equations in the sense of R.L. Hudsonand K.R. Parthasarathy. The notes are a contribution to quantum probability but they are also related to classical probability, quantum groups, and operator algebras. The Az ma martingales appear as examples of white noise on a Hopf algebra which is a deformation of the Heisenberg group. The book will be of interest to probabilists and quantum probabilists. Specialists in algebraic structures who are curious about the role of their concepts in probablility theory as well as quantum theory may find the book interesting. The reader should havesome knowledge of functional analysis, operator algebras, and probability theory. |
format |
Texto |
topic_facet |
Mathematics. Algebra. Mathematical analysis. Analysis (Mathematics). Probabilities. Physics. Mathematics. Probability Theory and Stochastic Processes. Analysis. Theoretical, Mathematical and Computational Physics. Algebra. |
author |
Schürmann, Michael. author. SpringerLink (Online service) |
author_facet |
Schürmann, Michael. author. SpringerLink (Online service) |
author_sort |
Schürmann, Michael. author. |
title |
White Noise on Bialgebras [electronic resource] / |
title_short |
White Noise on Bialgebras [electronic resource] / |
title_full |
White Noise on Bialgebras [electronic resource] / |
title_fullStr |
White Noise on Bialgebras [electronic resource] / |
title_full_unstemmed |
White Noise on Bialgebras [electronic resource] / |
title_sort |
white noise on bialgebras [electronic resource] / |
publisher |
Berlin, Heidelberg : Springer Berlin Heidelberg : Imprint: Springer, |
publishDate |
1993 |
url |
http://dx.doi.org/10.1007/BFb0089237 |
work_keys_str_mv |
AT schurmannmichaelauthor whitenoiseonbialgebraselectronicresource AT springerlinkonlineservice whitenoiseonbialgebraselectronicresource |
_version_ |
1756267106045788160 |