227. AI-Driven Primal-Dual Optimization for Solving European Option Pricing Model
Invited abstract in session TA-34: Advancements of OR-analytics in statistics, machine learning and data science 2, stream Advancements of OR-analytics in statistics, machine learning and data science.
Tuesday, 8:30-10:00Room: Michael Sadler LG10
Authors (first author is the speaker)
| 1. | Snehashish Chakraverty
|
| Mathematics, National Institute of Technology Rourkela | |
| 2. | Bhubaneswari Mishra
|
| Mathematics, National Institute of Technology Rourkela |
Abstract
The Black-Scholes model is a cornerstone in financial mathematics for pricing European options, offering closed-form solutions under idealized assumptions. However, these assumptions often fail to capture real-world complexities, limiting their practical applicability. This investigation introduces an innovative optimization-based approach using the AI method viz. Least Squares Support Vector Machine (LS-SVM) to solve the Black-Scholes partial differential equation (PDE). By reformulating the PDE into a constrained optimization problem, the method employs the primal-dual framework to derive the solutions. The optimization objective involves minimizing a regularized least-square cost function and incorporating a kernel-based structure to model the non-linear relationships inherent in option pricing effectively. Further, different Kernels have also been used to obtain comparative results showing the performance of these kernels in solving this problem. Compared to traditional numerical techniques, such as the finite difference method (FDM) and finite element method (FEM), the LS-SVM approach significantly enhances computational performance and accuracy. This study demonstrates the utility of optimization techniques for strengthening derivative pricing models, bridging theoretical and practical aspects of financial engineering. These findings underscore the potential of optimization-driven machine learning methodologies to revolutionize financial modeling.
Keywords
- Artificial Intelligence
- Machine Learning
- Optimization in Financial Mathematics
Status: accepted
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