The Black-Scholes theory of option pricing has been considered for many years as an important but very approximate zeroth-order description of actual market behavior. We generalize the functional form of the diffusion of these systems and also consider multi-factor models including stochastic volatility. Daily Eurodollar futures prices and implied volatilities are fit to determine exponents of functional behavior of diffusions using methods of global optimization, Adaptive Simulated Annealing (ASA), to generate tight fits across moving time windows of Eurodollar contracts. These short-time fitted distributions are then developed into long-time distributions using a robust non-Monte Carlo path-integral algorithm, PATHINT, togenerate prices a...
In this paper we recover the Black-Scholes and local volatility pricing engines in the presence of a...
This paper is an introduction and survey of Black-Scholes Model as a complete model for Option Valua...
Using mathematical techniques at undergraduate level, an introduction to axiomatic probability theor...
The Black-Scholes theory of option pricing has been considered for many years as an important but v...
©2004 COPYRIGHT SPIE--The International Society for Optical EngineeringIn this short note we propose...
Development of an efficient computational algorithm to price financial derivatives according to the ...
It is well established that stock market volatility has a memory of the past, moreover it is found t...
The Black-Scholes formula for pricing options on stocks and other securities has been generalized by...
This dissertation is an examination of methods for computing an option price using a path integral f...
The thesis considers the pricing of European path-dependent options in a multi-dimensional Black-Sch...
Several existing pricing models of financial derivatives as well as the effects of volatility risk a...
Stock Options are financial instruments whose values depend upon future price movements of the under...
The classical Black-Scholes analysis determines a unique, continuous, trading strategy which allows ...
In this paper we review the path integral technique which has wide applications in statistical physi...
In this paper we review some applications of the path integral methodology of quantum mechanics to f...
In this paper we recover the Black-Scholes and local volatility pricing engines in the presence of a...
This paper is an introduction and survey of Black-Scholes Model as a complete model for Option Valua...
Using mathematical techniques at undergraduate level, an introduction to axiomatic probability theor...
The Black-Scholes theory of option pricing has been considered for many years as an important but v...
©2004 COPYRIGHT SPIE--The International Society for Optical EngineeringIn this short note we propose...
Development of an efficient computational algorithm to price financial derivatives according to the ...
It is well established that stock market volatility has a memory of the past, moreover it is found t...
The Black-Scholes formula for pricing options on stocks and other securities has been generalized by...
This dissertation is an examination of methods for computing an option price using a path integral f...
The thesis considers the pricing of European path-dependent options in a multi-dimensional Black-Sch...
Several existing pricing models of financial derivatives as well as the effects of volatility risk a...
Stock Options are financial instruments whose values depend upon future price movements of the under...
The classical Black-Scholes analysis determines a unique, continuous, trading strategy which allows ...
In this paper we review the path integral technique which has wide applications in statistical physi...
In this paper we review some applications of the path integral methodology of quantum mechanics to f...
In this paper we recover the Black-Scholes and local volatility pricing engines in the presence of a...
This paper is an introduction and survey of Black-Scholes Model as a complete model for Option Valua...
Using mathematical techniques at undergraduate level, an introduction to axiomatic probability theor...