Add to ORKGA computational technique borrowed from the physical sciences is introduced to obtain accurate closed-form approximations for the transition probability of arbitrary diffusion processes. Within the path integral framework the same technique allows one to obtain remarkably good approximations of the pricing kernels of financial derivatives. Several examples are presented, and the application of these results to increase the efficiency of numerical approaches to derivative pricing is discussed
Abstract. This paper discusses extensions of the implied diffusion approach of Dupire (1994) to asse...
The shortcomings of diffusion models in representing the risk related to large market movements have...
In this paper we discuss a closed-form approximation of the likelihood functions of an arbitrary dif...
AbstractIn this paper, we investigate the transition probabilities for diffusion processes. In a fir...
In this paper, we investigate the transition probabilities for diffusion processes. In a first part,...
A new analytical approximation tool, derived from the classical PDE theory, is introduced in order t...
In this paper, we investigate the transition probabilities for diffusion processes. In a first part,...
We consider an important class of derivative contracts written on multiple assets which are traded o...
In this paper we consider various computational methods for pricing American style derivatives. We d...
Many mathematical assumptions on which classical derivative pricing methods are based have come unde...
We consider an n-dimensional square root process and we obtain a formula involving series expansions...
A numerical method for pricing financial derivatives based on continuous-time Markov chains is propo...
We present a numerical method for pricing derivatives on electricity prices. The method is based on ...
This work deals with the possibilities of financial derivatives pricing. Explained are especially ma...
Development of an efficient computational algorithm to price financial derivatives according to the ...
Abstract. This paper discusses extensions of the implied diffusion approach of Dupire (1994) to asse...
The shortcomings of diffusion models in representing the risk related to large market movements have...
In this paper we discuss a closed-form approximation of the likelihood functions of an arbitrary dif...
AbstractIn this paper, we investigate the transition probabilities for diffusion processes. In a fir...
In this paper, we investigate the transition probabilities for diffusion processes. In a first part,...
A new analytical approximation tool, derived from the classical PDE theory, is introduced in order t...
In this paper, we investigate the transition probabilities for diffusion processes. In a first part,...
We consider an important class of derivative contracts written on multiple assets which are traded o...
In this paper we consider various computational methods for pricing American style derivatives. We d...
Many mathematical assumptions on which classical derivative pricing methods are based have come unde...
We consider an n-dimensional square root process and we obtain a formula involving series expansions...
A numerical method for pricing financial derivatives based on continuous-time Markov chains is propo...
We present a numerical method for pricing derivatives on electricity prices. The method is based on ...
This work deals with the possibilities of financial derivatives pricing. Explained are especially ma...
Development of an efficient computational algorithm to price financial derivatives according to the ...
Abstract. This paper discusses extensions of the implied diffusion approach of Dupire (1994) to asse...
The shortcomings of diffusion models in representing the risk related to large market movements have...
In this paper we discuss a closed-form approximation of the likelihood functions of an arbitrary dif...