Add to ORKGWe study the Greek (risk) parameters of a nonlinear Black-Scholes partial differential equation whose nonlinearity is as a result of transaction costs. These parameters are derived from the Black-Scholes formula of the nonlinear Black-Scholes equation ut + 1 2 2s2uss(1 + 2 suss) = 0 by differentiating the formula with respect to either a variable or a parameter in the equation. The Black-Scholes formula and all the Greek parameters are of the form 1 f(s, t) and therefore they blow at = 0
Abstract. We study properties of solutions to fully nonlinear versions of the standard Black– Schole...
Les modèles mathématiques non linéaires de Black-Scholes sont des modèles qui permettent de valorise...
Nonlinear Black-Scholes equations provide more accurate values by taking into account more realistic...
Derivatives are used in hedging European options against risks. The partial derivatives of the solu...
This paper revisits some solution methods for Black-Scholes equation and some of its nonlinear versi...
We study a nonlinear Black-Scholes partial differential equation whose nonlinearity is as a result ...
In the field of quantitative financial analysis, the Black-Scholes Model has exerted significant inf...
Copyright c © 2013 R. Agliardi et al. This is an open access article distributed under the Creative ...
Date: 17 February, 2010We deal with the solvablity and a weak formulation of nonlinear partial diffe...
AbstractThe aim of this paper is to study the Black-Scholes option pricing model. We discuss some de...
Nonlinear Black–Scholes equations have been increasingly attracting interest over the last two decad...
summary:We deal with numerical computation of the nonlinear partial differential equations (PDEs) of...
Nonlinear Black-Scholes equations have been increasingly attracting interest over the last two decad...
There are some nonlinear models for pricing financial derivatives which can improve the linear Black...
The nonlinear differential equation option pricing formula is invaluable in financial derivatives in...
Abstract. We study properties of solutions to fully nonlinear versions of the standard Black– Schole...
Les modèles mathématiques non linéaires de Black-Scholes sont des modèles qui permettent de valorise...
Nonlinear Black-Scholes equations provide more accurate values by taking into account more realistic...
Derivatives are used in hedging European options against risks. The partial derivatives of the solu...
This paper revisits some solution methods for Black-Scholes equation and some of its nonlinear versi...
We study a nonlinear Black-Scholes partial differential equation whose nonlinearity is as a result ...
In the field of quantitative financial analysis, the Black-Scholes Model has exerted significant inf...
Copyright c © 2013 R. Agliardi et al. This is an open access article distributed under the Creative ...
Date: 17 February, 2010We deal with the solvablity and a weak formulation of nonlinear partial diffe...
AbstractThe aim of this paper is to study the Black-Scholes option pricing model. We discuss some de...
Nonlinear Black–Scholes equations have been increasingly attracting interest over the last two decad...
summary:We deal with numerical computation of the nonlinear partial differential equations (PDEs) of...
Nonlinear Black-Scholes equations have been increasingly attracting interest over the last two decad...
There are some nonlinear models for pricing financial derivatives which can improve the linear Black...
The nonlinear differential equation option pricing formula is invaluable in financial derivatives in...
Abstract. We study properties of solutions to fully nonlinear versions of the standard Black– Schole...
Les modèles mathématiques non linéaires de Black-Scholes sont des modèles qui permettent de valorise...
Nonlinear Black-Scholes equations provide more accurate values by taking into account more realistic...