Add to ORKGWe study the general model of self-financing trading strategies in illiquid markets introduced by Schoenbucher and Wilmott, 2000. A hedging strategy in the framework of this model satisfies a nonlinear partial differential equation (PDE) which contains some function g(alpha). This function is deep connected to an utility function. We describe the Lie symmetry algebra of this PDE and provide a complete set of reductions of the PDE to ordinary differential equations (ODEs). In addition we are able to describe all types of functions g(alpha) for which the PDE admits an extended Lie group. Two of three special type functions lead to models introduced before by different authors, one is new. We clarify the connection between these three special ...
In this paper it is considered the Sircar-Papanicolaou model wich takesinto account a feedback effec...
We consider a bond‐pricing model described in terms of partial differential equations (PDEs). Classi...
Abstract. We develop the complete 6-dimensional classical symmetry group of the partial differential...
We study the general model of self-financing trading strategies inilliquid markets introduced by Sch...
We study a class of nonlinear pricing models which involves the feedback effect from the dynamic hed...
We consider one transaction costs model which was suggested by Cetin, Jarrow and Protter (2004) for ...
The present model describes a perfect hedging strategy for a large trader. In this case the hedging ...
We use partial differential equations (PDEs) to describe the pricing process of options in an illiqu...
Diese Arbeit ist einer Verallgemeinerung des bekannten Black-Scholes-Modells gewidmet, welches eines...
This master project is dedicated to the analysis of one of the nancialmarket models in an illiquid m...
In financial markets one is sometimes confronted with a complicated system of partial differential e...
In the standard modeling of the pricing of options and derivatives as generally understood these day...
We provide group invariant solutions to two nonlinear differential equations associated with the val...
A first-order feedback model of option pricing consisting of a coupled system of two PDEs, a nonline...
The Guéant and Pu model of option pricing and hedging, which takes into account transaction costs, a...
In this paper it is considered the Sircar-Papanicolaou model wich takesinto account a feedback effec...
We consider a bond‐pricing model described in terms of partial differential equations (PDEs). Classi...
Abstract. We develop the complete 6-dimensional classical symmetry group of the partial differential...
We study the general model of self-financing trading strategies inilliquid markets introduced by Sch...
We study a class of nonlinear pricing models which involves the feedback effect from the dynamic hed...
We consider one transaction costs model which was suggested by Cetin, Jarrow and Protter (2004) for ...
The present model describes a perfect hedging strategy for a large trader. In this case the hedging ...
We use partial differential equations (PDEs) to describe the pricing process of options in an illiqu...
Diese Arbeit ist einer Verallgemeinerung des bekannten Black-Scholes-Modells gewidmet, welches eines...
This master project is dedicated to the analysis of one of the nancialmarket models in an illiquid m...
In financial markets one is sometimes confronted with a complicated system of partial differential e...
In the standard modeling of the pricing of options and derivatives as generally understood these day...
We provide group invariant solutions to two nonlinear differential equations associated with the val...
A first-order feedback model of option pricing consisting of a coupled system of two PDEs, a nonline...
The Guéant and Pu model of option pricing and hedging, which takes into account transaction costs, a...
In this paper it is considered the Sircar-Papanicolaou model wich takesinto account a feedback effec...
We consider a bond‐pricing model described in terms of partial differential equations (PDEs). Classi...
Abstract. We develop the complete 6-dimensional classical symmetry group of the partial differential...