Using traditional methods it is possible to prove the Ito formula in a Hilbert space and some Banach spaces with special geometrical properties. The class of such Banach spaces is very narrow-they are subclass of reflexive Banach spaces. Using the definition of a generalized stochastic integral, early we proved the Ito formula in an arbitrary Banach space for the case, when as initial Ito process was the Wiener process. For an arbitrary Banach space and an arbitrary Ito process it is impossible to find the sequence of corresponding step functions with the desired convergence. We consider the space of generalized random processes, introduce general Ito process there and prove in it the Ito formula. Afterward, from the main Ito process in a Banach space we receive the generalized Ito process in the space of generalized random processes and we get the Ito formula in this space. Then we check decompasibilility of the members of the received equality and as they turn out Banach space valued, we get the Ito formula in an arbitrary Banach space. We implemented this approach when the stochastic integral in the Ito process was taken from a Banach space valued non-anticipating random process by the one dimensional Wiener process. In this paper we consider the case, when the stochastic integral is taken from an operator- valued non-anticipating random process by the Wiener process with values in a Banach space.
| Published in | Pure and Applied Mathematics Journal (Volume 4, Issue 4) |
| DOI | 10.11648/j.pamj.20150404.15 |
| Page(s) | 164-171 |
| Creative Commons |
This is an Open Access article, distributed under the terms of the Creative Commons Attribution 4.0 International License (http://creativecommons.org/licenses/by/4.0/), which permits unrestricted use, distribution and reproduction in any medium or format, provided the original work is properly cited. |
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Copyright © The Author(s), 2015. Published by Science Publishing Group |
Wiener Process in a Banach Space, Covariance Operators, Ito Stochastic Integrals and Ito Processes, the Ito Formula, Stochastic Differential Equations in a Banach Space
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APA Style
Badri Mamporia. (2015). The Ito Formula for the Ito Processes Driven by the Wiener Processes in a Banach Space. Pure and Applied Mathematics Journal, 4(4), 164-171. https://doi.org/10.11648/j.pamj.20150404.15
ACS Style
Badri Mamporia. The Ito Formula for the Ito Processes Driven by the Wiener Processes in a Banach Space. Pure Appl. Math. J. 2015, 4(4), 164-171. doi: 10.11648/j.pamj.20150404.15
AMA Style
Badri Mamporia. The Ito Formula for the Ito Processes Driven by the Wiener Processes in a Banach Space. Pure Appl Math J. 2015;4(4):164-171. doi: 10.11648/j.pamj.20150404.15
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Download@article{10.11648/j.pamj.20150404.15,
author = {Badri Mamporia},
title = {The Ito Formula for the Ito Processes Driven by the Wiener Processes in a Banach Space},
journal = {Pure and Applied Mathematics Journal},
volume = {4},
number = {4},
pages = {164-171},
doi = {10.11648/j.pamj.20150404.15},
url = {https://doi.org/10.11648/j.pamj.20150404.15},
eprint = {https://article.sciencepublishinggroup.com/pdf/10.11648.j.pamj.20150404.15},
abstract = {Using traditional methods it is possible to prove the Ito formula in a Hilbert space and some Banach spaces with special geometrical properties. The class of such Banach spaces is very narrow-they are subclass of reflexive Banach spaces. Using the definition of a generalized stochastic integral, early we proved the Ito formula in an arbitrary Banach space for the case, when as initial Ito process was the Wiener process. For an arbitrary Banach space and an arbitrary Ito process it is impossible to find the sequence of corresponding step functions with the desired convergence. We consider the space of generalized random processes, introduce general Ito process there and prove in it the Ito formula. Afterward, from the main Ito process in a Banach space we receive the generalized Ito process in the space of generalized random processes and we get the Ito formula in this space. Then we check decompasibilility of the members of the received equality and as they turn out Banach space valued, we get the Ito formula in an arbitrary Banach space. We implemented this approach when the stochastic integral in the Ito process was taken from a Banach space valued non-anticipating random process by the one dimensional Wiener process. In this paper we consider the case, when the stochastic integral is taken from an operator- valued non-anticipating random process by the Wiener process with values in a Banach space.},
year = {2015}
}
TY - JOUR T1 - The Ito Formula for the Ito Processes Driven by the Wiener Processes in a Banach Space AU - Badri Mamporia Y1 - 2015/08/10 PY - 2015 N1 - https://doi.org/10.11648/j.pamj.20150404.15 DO - 10.11648/j.pamj.20150404.15 T2 - Pure and Applied Mathematics Journal JF - Pure and Applied Mathematics Journal JO - Pure and Applied Mathematics Journal SP - 164 EP - 171 PB - Science Publishing Group SN - 2326-9812 UR - https://doi.org/10.11648/j.pamj.20150404.15 AB - Using traditional methods it is possible to prove the Ito formula in a Hilbert space and some Banach spaces with special geometrical properties. The class of such Banach spaces is very narrow-they are subclass of reflexive Banach spaces. Using the definition of a generalized stochastic integral, early we proved the Ito formula in an arbitrary Banach space for the case, when as initial Ito process was the Wiener process. For an arbitrary Banach space and an arbitrary Ito process it is impossible to find the sequence of corresponding step functions with the desired convergence. We consider the space of generalized random processes, introduce general Ito process there and prove in it the Ito formula. Afterward, from the main Ito process in a Banach space we receive the generalized Ito process in the space of generalized random processes and we get the Ito formula in this space. Then we check decompasibilility of the members of the received equality and as they turn out Banach space valued, we get the Ito formula in an arbitrary Banach space. We implemented this approach when the stochastic integral in the Ito process was taken from a Banach space valued non-anticipating random process by the one dimensional Wiener process. In this paper we consider the case, when the stochastic integral is taken from an operator- valued non-anticipating random process by the Wiener process with values in a Banach space. VL - 4 IS - 4 ER -
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