The aim of this paper is to numerically price the European double barrier option by calculating the governing fractional Black-Scholes equation in illiquid markets. Incorporating the price impact into the underlying asset dynamic, which means that trading strategies affect the underlying price, we consider markets with finite liquidity. We survey both cases of first-order feedback and full feedback. Asset evolution satisfies a stochastic differential equation with fractional noise, which is more realistic in markets with statistical dependence. Moreover, the Sinc-collocation method is used to price the option. Numerical experiments show that the results highly correspond to our expectation of illiquid markets
This article studies the pricing of options in an extended Black Scholes economy in which the underl...
Philosophiae Doctor - PhDConventional partial differential equations under the classical Black-Schol...
We investigate the problem of pricing derivatives under a fractional stochastic volatility model. We...
Markets liquidity is an issue of very high concern in financial risk management. In a perfect liquid...
The purpose of this paper is to obtain a fractional Black-Scholes formula for the price of an option...
Most of the recent literature dealing with the modeling of financial assets assumes that the underly...
The Black-Scholes model is commonly used to track the price of European options with respect to matu...
2020 Elsevier B.V. In this paper, we investigate the European option pricing problem under a regime ...
The purpose of this thesis is to study the option pricing and hedging in an illiquid market. In orde...
This paper deals with the problem of discrete-time option pricing by the mixed fractional version of...
We consider conditional-mean hedging in a fractional Black–Scholes pricing model in the presence of ...
AbstractThis paper deals with the numerical analysis and simulation of nonlinear Black–Scholes equat...
We consider the pricing problem related to payoffs of polynomial growth that can have discontinuitie...
Following the framework of Cetin et al. (finance stoch. 8:311-341, 2004), we study the problem of su...
Different derivative securities, including European options, are very popular and widely used in fo...
This article studies the pricing of options in an extended Black Scholes economy in which the underl...
Philosophiae Doctor - PhDConventional partial differential equations under the classical Black-Schol...
We investigate the problem of pricing derivatives under a fractional stochastic volatility model. We...
Markets liquidity is an issue of very high concern in financial risk management. In a perfect liquid...
The purpose of this paper is to obtain a fractional Black-Scholes formula for the price of an option...
Most of the recent literature dealing with the modeling of financial assets assumes that the underly...
The Black-Scholes model is commonly used to track the price of European options with respect to matu...
2020 Elsevier B.V. In this paper, we investigate the European option pricing problem under a regime ...
The purpose of this thesis is to study the option pricing and hedging in an illiquid market. In orde...
This paper deals with the problem of discrete-time option pricing by the mixed fractional version of...
We consider conditional-mean hedging in a fractional Black–Scholes pricing model in the presence of ...
AbstractThis paper deals with the numerical analysis and simulation of nonlinear Black–Scholes equat...
We consider the pricing problem related to payoffs of polynomial growth that can have discontinuitie...
Following the framework of Cetin et al. (finance stoch. 8:311-341, 2004), we study the problem of su...
Different derivative securities, including European options, are very popular and widely used in fo...
This article studies the pricing of options in an extended Black Scholes economy in which the underl...
Philosophiae Doctor - PhDConventional partial differential equations under the classical Black-Schol...
We investigate the problem of pricing derivatives under a fractional stochastic volatility model. We...