We prove the superhedging duality for a discrete-time financial market with proportional transaction costs under model uncertainty. Frictions are modeled through solvency cones as in the original model of [Kabanov, Y., Hedging and liquidation under transaction costs in currency markets. Fin. Stoch., 3(2):237-248, 1999] adapted to the quasi-sure setup of [Bouchard, B. and Nutz, M., Arbitrage and duality in nondominated discrete-time models. Ann. Appl. Probab., 25(2):823-859, 2015]. Our approach allows to remove the restrictive assumption of No Arbitrage of the Second Kind considered in [Bouchard, B., Deng, S. and Tan, X., Super-replication with proportional transaction cost under model uncertainty, Math. Fin., 29(3):837-860, 2019] and to sho...
We consider a multi-asset discrete-time model of a financial market with proportional transaction co...
In contrast with the classical models of frictionless financial markets, market models with proport...
We pursue robust approach to pricing and hedging in mathematical finance. We consider a continuous t...
We prove the superhedging duality for a discrete-time financial market with proportional transaction...
We provide a fundamental theorem of asset pricing and a superhedging theorem for a model indepen- de...
In a model-free discrete time financial market, we prove the superhedging duality theorem, where tra...
We consider the fundamental theorem of asset pricing (FTAP) and the hedging prices of options under ...
We consider the superhedging price of an exotic option under nondominated model uncertainty in discr...
We consider a continuous time multivariate financial market with proportional transaction costs and ...
We discuss fundamental questions of Mathematical Finance such as arbitrage and hedging in the contex...
We provide a model-free pricing–hedging duality in continuous time. For a frictionless market consis...
International audienceIn contrast with the classical models of frictionless financial markets, marke...
We study contingent claims in a discrete-time market model where trading costs are given by convex f...
We consider a nondominated model of a discrete-time financial market where stocks are traded dynamic...
In a continuous-time model with multiple assets described by càdlàg processes, this paper characteri...
We consider a multi-asset discrete-time model of a financial market with proportional transaction co...
In contrast with the classical models of frictionless financial markets, market models with proport...
We pursue robust approach to pricing and hedging in mathematical finance. We consider a continuous t...
We prove the superhedging duality for a discrete-time financial market with proportional transaction...
We provide a fundamental theorem of asset pricing and a superhedging theorem for a model indepen- de...
In a model-free discrete time financial market, we prove the superhedging duality theorem, where tra...
We consider the fundamental theorem of asset pricing (FTAP) and the hedging prices of options under ...
We consider the superhedging price of an exotic option under nondominated model uncertainty in discr...
We consider a continuous time multivariate financial market with proportional transaction costs and ...
We discuss fundamental questions of Mathematical Finance such as arbitrage and hedging in the contex...
We provide a model-free pricing–hedging duality in continuous time. For a frictionless market consis...
International audienceIn contrast with the classical models of frictionless financial markets, marke...
We study contingent claims in a discrete-time market model where trading costs are given by convex f...
We consider a nondominated model of a discrete-time financial market where stocks are traded dynamic...
In a continuous-time model with multiple assets described by càdlàg processes, this paper characteri...
We consider a multi-asset discrete-time model of a financial market with proportional transaction co...
In contrast with the classical models of frictionless financial markets, market models with proport...
We pursue robust approach to pricing and hedging in mathematical finance. We consider a continuous t...