A semi-analytic valuation of two-asset barrier options and autocallable products using Brownian bridge |
| |
Affiliation: | 1. Department of Actuarial Science and Mathematics, Sungkyunkwan University, Republic of Korea;2. Department of Economics, Sungkyunkwan University, Republic of Korea;3. Korea Institute of Public Finance, Republic of Korea |
| |
Abstract: | Barrier options based upon the extremum of more than one underlying prices do not allow for closed-form pricing formulas, and thus require numerical methods to evaluate. One example is the autocallable structured product with knock-in feature, which has gained a great deal of popularity in the recent decades. In order to increase numerical efficiency for pricing such products, this paper develops a semi-analytic valuation algorithm which is free from the computational burden and the monitoring bias of the crude Monte Carlo simulation. The basic idea is to combine the simulation of the underlying prices at certain time points and the exit (or non-exit) probability of the Brownian bridge. In the literature, the algorithm was developed to deal with a single-asset barrier option under the Black–Scholes model. Now we extend the framework to cover two-asset barrier options and autocallable product. For the purpose, we explore the non-exit probability of the two-dimensional Brownian bridge, which has not been researched before. Meanwhile, we employ the actuarial method of Esscher transform to simplify our calculation and improve our algorithm via importance sampling. We illustrate our algorithm with numerical examples. |
| |
Keywords: | Autocallable structured product Barrier options Black–Scholes model Esscher transform Non-exit probability Two-dimensional Brownian bridge |
本文献已被 ScienceDirect 等数据库收录! |
|