The generalized 5D Black-Scholes differential equation with stochastic volatility is derived. The projections of the stochastic evolutions associated with the random variables from an enlarged space or superspace onto an ordinary space can be achieved via higher-dimensional operators. The stochastic nature of the securities and volatility associated with the 3D Merton-Garman equation can then be interpreted as the effects of the extra dimensions. We showed that the Merton-Garman equation is the first excited state, i.e. n=m=1, within a family which contain an infinite numbers of Merton-Garman-like equations.
We solve in closed form a parsimonious extension of the Black-Scholes-Merton model with bankruptcy w...
This work focuses on the application of stochastic differential equations, with martingales, in fina...
In this paper we provide an extensive classification of one and two dimensional diffusion processes ...
Non-equilibrium phenomena occur not only in the physical world, but also in finance. In this work, s...
The Black-Scholes formula for pricing options on stocks and other securities has been generalized by...
Thesis investigates the dynamics of financial markets. Nowadays, this is one of the emergent fields ...
For this thesis, we derive new applications and theoretical results for some multidimensional mean-r...
Thesis investigates the dynamics of financial markets. Nowadays, this is one of the emergent fields ...
For this thesis, we derive new applications and theoretical results for some multidimensional mean-r...
This paper proposes a new approximation method of pricing barrier and average options under stochast...
Classical solvable stochastic volatility models (SVM) use a CEV process for instantaneous variance w...
Abstract: The Black Scholes model of option pricing constitutes the cornerstone of contemporary valu...
This paper proposes a new approximation method of pricing barrier and average options under stochast...
This work focuses on the application of stochastic differential equations, with martingales, in fina...
We consider high-dimensional asset price models that are reduced in their dimension in order to redu...
We solve in closed form a parsimonious extension of the Black-Scholes-Merton model with bankruptcy w...
This work focuses on the application of stochastic differential equations, with martingales, in fina...
In this paper we provide an extensive classification of one and two dimensional diffusion processes ...
Non-equilibrium phenomena occur not only in the physical world, but also in finance. In this work, s...
The Black-Scholes formula for pricing options on stocks and other securities has been generalized by...
Thesis investigates the dynamics of financial markets. Nowadays, this is one of the emergent fields ...
For this thesis, we derive new applications and theoretical results for some multidimensional mean-r...
Thesis investigates the dynamics of financial markets. Nowadays, this is one of the emergent fields ...
For this thesis, we derive new applications and theoretical results for some multidimensional mean-r...
This paper proposes a new approximation method of pricing barrier and average options under stochast...
Classical solvable stochastic volatility models (SVM) use a CEV process for instantaneous variance w...
Abstract: The Black Scholes model of option pricing constitutes the cornerstone of contemporary valu...
This paper proposes a new approximation method of pricing barrier and average options under stochast...
This work focuses on the application of stochastic differential equations, with martingales, in fina...
We consider high-dimensional asset price models that are reduced in their dimension in order to redu...
We solve in closed form a parsimonious extension of the Black-Scholes-Merton model with bankruptcy w...
This work focuses on the application of stochastic differential equations, with martingales, in fina...
In this paper we provide an extensive classification of one and two dimensional diffusion processes ...
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