Title :
Optimization based option pricing bounds via piecewise polynomial super- and sub-martingales
Author :
Primbs, James A.
Author_Institution :
Manage. Sci. & Eng. Dept., Stanford Univ., Stanford, CA
Abstract :
In this paper we first prove sufficient conditions for a continuous function of a diffusion process to be a super- or sub-martingale. This result is then used to create piecewise polynomial super- and sub-martingale bounds on option prices via a polynomial optimization problem. The polynomial optimization problem is solved under a sum-of-squares paradigm and thus uses semi-definite programming. The results are tested on a Black-Scholes example where a piecewise polynomial function of degree four in both the stock value and time is used to compute upper and lower bounds.
Keywords :
continuous systems; mathematical programming; piecewise polynomial techniques; pricing; continuous function; option prices; option pricing bound; piecewise polynomial supermartingales; polynomial optimization problem; semidefinite programming; submartingales; sufficient condition; sum-of-squares paradigm; Differential equations; Diffusion processes; Optimization methods; Particle measurements; Polynomials; Pricing; Q measurement; Stochastic processes; Sufficient conditions; Testing;
Conference_Titel :
American Control Conference, 2008
Conference_Location :
Seattle, WA
Print_ISBN :
978-1-4244-2078-0
Electronic_ISBN :
0743-1619
DOI :
10.1109/ACC.2008.4586517
