TITLE:
Portfolio Selection in Mean-Minimum Return Level-Expected Bounded First Passage Time Framework
AUTHORS:
Tsotne Kutalia
KEYWORDS:
Multi-Dimensional Geometric Brownian Motion, Ito’s Process, Portfolio Optimization, Optimal Stopping Time
JOURNAL NAME:
Journal of Mathematical Finance,
Vol.9 No.3,
June
20,
2019
ABSTRACT: This paper explores the selection of optimal portfolio by replacing the standard Mean-Variance model by Mean-Minimum Return Level (MRL) framework and adding one important dimension—expectation of bounded First Passage Time (FPT) towards the MRL. To measure how much a given portfolio is exposed to risk, the new model can capture both, the amount of the largest possible loss at a certain confidence level and time to such an event occurring. The novelty of this paper is the introduction of bounded first passage time towards MRL and taking its expectation into consideration as an additional factor in portfolio selection decision making. Assuming that the asset price dynamics follow multi-dimensional Geometric Brownian Motion with drift, we obtain a portfolio wealth process for multiple assets and we evaluate the lowest possible value to which it can drop by a high confidence level. Then we extend our examination of the optimal portfolio selection by ultimately obtaining the efficient surface of risky portfolios. As a result, the paper shows that the third dimension can make a significant difference while choosing the asset weights compared to classical models ignoring the portfolio return paths as long as they achieve a desired combination of risk and return.