- P-ISSN1226-0657
- E-ISSN2287-6081
- KCI
ISSN : 1226-0657
Article Contents
- 2024 (Vol.31)
- 2023 (Vol.30)
- 2022 (Vol.29)
- 2021 (Vol.28)
- 2020 (Vol.27)
- 2019 (Vol.26)
- 2018 (Vol.25)
- 2017 (Vol.24)
- 2016 (Vol.23)
- 2015 (Vol.22)
- 2014 (Vol.21)
- 2013 (Vol.20)
- 2012 (Vol.19)
- 2011 (Vol.18)
- 2010 (Vol.17)
- 2009 (Vol.16)
- 2008 (Vol.15)
- 2007 (Vol.14)
- 2006 (Vol.13)
- 2005 (Vol.12)
- 2004 (Vol.11)
- 2003 (Vol.10)
- 2002 (Vol.9)
- 2001 (Vol.8)
- 2000 (Vol.7)
- 1999 (Vol.6)
- 1998 (Vol.5)
- 1997 (Vol.4)
- 1996 (Vol.3)
- 1995 (Vol.2)
- 1994 (Vol.1)
Stochastic Calculus for Analogue of Wiener Process
Journal of the Korean Society of Mathematical Education Series B: The Pure and Applied Mathematics / Journal of the Korean Society of Mathematical Education Series B: The Pure and Applied Mathematics, (P)1226-0657; (E)2287-6081
2007, v.14 no.4, pp.335-354
Im, Man-Kyu
Kim, Jae-Hee
Kim, Jae-Hee
Im,,
M.
, &
Kim,,
J.
(2007). Stochastic Calculus for Analogue of Wiener Process. Journal of the Korean Society of Mathematical Education Series B: The Pure and Applied Mathematics, 14(4), 335-354.
Abstract
In this paper, we define an analogue of generalized Wiener measure and investigate its basic properties. We define (<TEX>${\hat}It{o}$</TEX> type) stochastic integrals with respect to the generalized Wiener process and prove the <TEX>${\hat}It{o}$</TEX> formula. The existence and uniqueness of the solution of stochastic differential equation associated with the generalized Wiener process is proved. Finally, we generalize the linear filtering theory of Kalman-Bucy to the case of a generalized Wiener process.
- keywords
- generalized Wiener process, stochastic integral, <tex> ${\hat}It{o}$</tex> formula, stochastic differential equation, linear filtering
- Downloaded
- Viewed
- 0KCI Citations
- 0WOS Citations