In the first part of this thesis, we introduce the concept of prospective strict no-arbitrage for discrete-time financial market models with proportional transaction. The prospective strict no-arbitrage condition, which is a variant of strict no-arbitrage, is slightly weaker than the robust no-arbitrage condition. It still implies that the set of portfolios attainable from zero initial endowment is closed in probability. Consequently, prospective strict no-arbitrage implies the existence of consistent prices, which may lie on the boundary of the bid-ask spread. A weak version of prospective strict no-arbitrage turns out to be equivalent to the existence of a consistent price system. In continuous-time financial market models with proportio...
Motivated by applications to bond markets, we propose a multivariate framework for discrete time fin...
This thesis studies no-arbitrage pricing and dynamic conic nance for dividend-paying securities in d...
We discuss fundamental questions of Mathematical Finance such as arbitrage and hedging in the contex...
We discuss the no-arbitrage conditions in a general framework for discrete-time models of financial ...
International audienceIn contrast with the classical models of frictionless financial markets, marke...
We provide a fundamental theorem of asset pricing and a superhedging theorem for a model indepen- de...
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 prove a version of the Fundamental Theorem of Asset Pricing, which applies to Kabanov's approach ...
We propose a continuous time model for financial markets with proportional transactions costs and a ...
A standing assumption in the literature on proportional transaction costs is efficient friction. Tog...
We extend the fundamental theorem of asset pricing to the case of markets with liquidity risk. Our r...
Standard models for \u85nancial markets are based on the simplifying assumption that trading orders ...
This paper studies arbitrage pricing theory in financial markets with implicit transaction costs. We...
We prove a version of First Fundamental Theorem of Asset Pricing under transaction costs for discret...
Motivated by applications to bond markets, we propose a multivariate framework for discrete time fin...
This thesis studies no-arbitrage pricing and dynamic conic nance for dividend-paying securities in d...
We discuss fundamental questions of Mathematical Finance such as arbitrage and hedging in the contex...
We discuss the no-arbitrage conditions in a general framework for discrete-time models of financial ...
International audienceIn contrast with the classical models of frictionless financial markets, marke...
We provide a fundamental theorem of asset pricing and a superhedging theorem for a model indepen- de...
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 prove a version of the Fundamental Theorem of Asset Pricing, which applies to Kabanov's approach ...
We propose a continuous time model for financial markets with proportional transactions costs and a ...
A standing assumption in the literature on proportional transaction costs is efficient friction. Tog...
We extend the fundamental theorem of asset pricing to the case of markets with liquidity risk. Our r...
Standard models for \u85nancial markets are based on the simplifying assumption that trading orders ...
This paper studies arbitrage pricing theory in financial markets with implicit transaction costs. We...
We prove a version of First Fundamental Theorem of Asset Pricing under transaction costs for discret...
Motivated by applications to bond markets, we propose a multivariate framework for discrete time fin...
This thesis studies no-arbitrage pricing and dynamic conic nance for dividend-paying securities in d...
We discuss fundamental questions of Mathematical Finance such as arbitrage and hedging in the contex...