AbstractNonlinear Black–Scholes equations have been increasingly attracting interest over the last two decades, since they provide more accurate values by taking into account more realistic assumptions, such as transaction costs, risks from an unprotected portfolio, large investor’s preferences or illiquid markets (which may have an impact on the stock price), the volatility, the drift and the option price itself.In this paper we will focus on several models from the most relevant class of nonlinear Black–Scholes equations for European and American options with a volatility depending on different factors, such as the stock price, the time, the option price and its derivatives due to transaction costs. We will analytically approach the optio...
Due to transaction costs, illiquid markets, large investors or risks from an unprotected portfolio t...
Thesis (Ph.D.), Washington State UniversityOptions are a fundamental and important type of financial...
In this paper, a proposed computational method referred to as Projected Differential Transformation...
Nonlinear Black–Scholes equations have been increasingly attracting interest over the last two decad...
AbstractNonlinear Black–Scholes equations have been increasingly attracting interest over the last t...
Due to transaction costs, illiquid markets, large investors or risks from an unprotected portfolio ...
Nonlinear Black-Scholes equations have been increasingly attracting interest over the last two decad...
Due to transaction costs, illiquid markets, large investors or risks from an unprotected portfolio t...
AbstractThis paper deals with the numerical solution of Black–Scholes option pricing partial differe...
AbstractThis paper deals with the Barles–Soner model arising in the hedging of portfolios for option...
Since financial engineering problems are of great importance in the academic community, effective me...
We investigate qualitative and quantitative behavior of a solution of the mathematical model for pri...
summary:We deal with numerical computation of the nonlinear partial differential equations (PDEs) of...
Market illiquidity, feedback effects, presence of transaction costs, risk from unprotected portfolio...
We investigate qualitative and quantitative behavior of a solution to the problem of pricing America...
Due to transaction costs, illiquid markets, large investors or risks from an unprotected portfolio t...
Thesis (Ph.D.), Washington State UniversityOptions are a fundamental and important type of financial...
In this paper, a proposed computational method referred to as Projected Differential Transformation...
Nonlinear Black–Scholes equations have been increasingly attracting interest over the last two decad...
AbstractNonlinear Black–Scholes equations have been increasingly attracting interest over the last t...
Due to transaction costs, illiquid markets, large investors or risks from an unprotected portfolio ...
Nonlinear Black-Scholes equations have been increasingly attracting interest over the last two decad...
Due to transaction costs, illiquid markets, large investors or risks from an unprotected portfolio t...
AbstractThis paper deals with the numerical solution of Black–Scholes option pricing partial differe...
AbstractThis paper deals with the Barles–Soner model arising in the hedging of portfolios for option...
Since financial engineering problems are of great importance in the academic community, effective me...
We investigate qualitative and quantitative behavior of a solution of the mathematical model for pri...
summary:We deal with numerical computation of the nonlinear partial differential equations (PDEs) of...
Market illiquidity, feedback effects, presence of transaction costs, risk from unprotected portfolio...
We investigate qualitative and quantitative behavior of a solution to the problem of pricing America...
Due to transaction costs, illiquid markets, large investors or risks from an unprotected portfolio t...
Thesis (Ph.D.), Washington State UniversityOptions are a fundamental and important type of financial...
In this paper, a proposed computational method referred to as Projected Differential Transformation...