Stochastic Integration on Stochastic Sets of Interval Type and Applications to Mathematical Finance

Abstract

In the existing works, stochastic sets B of interval type, along with B-stochastic processes, were introduced within the framework of stochastic analysis. In this paper, we undertake the construction of B-stochastic integration by exploring three novel types of B-stochastic integrals: Stieltjes integrals of B-predictable processes with respect to B-adapted processes with finite variation, stochastic integrals of B-predictable processes with respect to B-inner local martingales, and stochastic integrals of B-predictable processes with respect to B-inner semimartingales. These B-stochastic integrals are exclusively defined on subsets B, with values outside the scope of B being deemed irrelevant. Additionally, we present several notable consequences, including the relationship between B-stochastic integrals and existing stochastic integrals, as well as It\o's formula for B-inner semimartingales. In the context of models pertaining to uncertain time-horizons in mathematical finance, we establish essentials of mathematical finance for general markets characterized by sudden-stop horizons. This is achieved by defining self-financing strategies, admissible strategies, and no-arbitrary conditions. In such financial markets, the exclusivity characteristic inherent in B-stochastic integrals offers investors a viable alternative approach. This approach enables them to effectively filter out unnecessary information pertaining to asset price dynamics and portfolio strategies that extend beyond the predefined time-horizons.