On the Properties of the Itô-Henstock Integral
Final Defense
On the Properties of the Itô-Henstock Integral
by Charles D. Broñosa
MS Mathematics Candidate
Date: Friday, 05 July 2024
Time: 4 pm
Venue: Online
Advisers:
Emmanuel A. Cabral, PhD
Ateneo de Manila University
Timothy Robin Y. Teng, PhD
Ateneo de Manila University
Panelists:
Jayrold P. Arcede, PhD
Caraga State University
Elvira P. De Lara-Tuprio, PhD
Ateneo de Manila University
Job A. Nable, PhD
Ateneo de Manila University
In this thesis, a definition of the Itô-Henstock Integral with respect to the Brownian motion W is introduced. Based on this definition, some useful properties such as uniqueness, additivity of the integral, integrability over subitervals, Cauchy criterion, and isometry are shown to hold true also for the Itô-Henstock integral. Furthermore, some characterizations of this integral, such as orthogonal increment property, L2 martingale, and AC2 property, are also established. These properties are necessary in the study of Itô stochastic integration based on the theory of Henstock integration. As a final result, the thesis ends with an integration by parts formula, where an extended definition of the Itô-Henstock integral with respect to a general process X is introduced. This formula is established using the definition and properties that were devel- oped earlier in the thesis.
Key Words: Itô-Henstock integral, Stochastic integration by parts, Henstock integration