標題: 弱布朗運動及其應用
Weak Brownian Motion and Its Applications
作者: 吳慶堂
Wu Ching-Tang
國立交通大學應用數學系(所)
關鍵字: 布朗運動;弱布朗運動;邊際分佈;Brownian motion;weak Brownian motion;marginal distribution
公開日期: 2009
摘要: 弱布朗運動為一其k 次邊際分佈與布朗運動之k 次邊際分佈相同之隨機過程. Stoyanov 於 1987 年提出此隨機過程並不需為布朗運動的猜測, 而Föllmer-Wu-Yor 則於2000 年解決 了這個問題. 在此研究計畫中, 我們主要是想解決一些弱布朗運動的open problems, 例如二次與三次弱布朗運動的quadratic variation 的值的問題. 另外, 弱布朗運動在財務數 學上的應用亦是我們有興趣的問題.
A weak Brownian motion of order k is a stochastic process whose k-dimensional marginal is identical with that of a standard Brownian motion. A weak Brownian motion is not necessary to be a Brownian motion. This was a conjecture appeared in Stoyanov (1987) and solved in Föllmer-Wu-Yor (2000). In this project we aim to solve some open problems in the weak Brownian motion, for example, the value of the quadratic variation of weak Brownian motion of order 2 and 3. Furthermore, we want to discuss the applications of the weak Brownian motion in finance.
官方說明文件#: NSC98-2115-M009-006
URI: http://hdl.handle.net/11536/101687
https://www.grb.gov.tw/search/planDetail?id=1881302&docId=310696
Appears in Collections:Research Plans


Files in This Item:

  1. 982115M009006.PDF

If it is a zip file, please download the file and unzip it, then open index.html in a browser to view the full text content.