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      Robust martingale selection problem and its connections to the no-arbitrage theory

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          Abstract

          We analyze the martingale selection problem of Rokhlin (2006) in a pointwise (robust) setting. We derive conditions for solvability of this problem and show how it is related to the classical no-arbitrage deliberations. We obtain versions of the Fundamental Theorem of Asset Pricing in examples spanning frictionless markets, models with proportional transaction costs and also models for illiquid markets. In all these examples, we also incorporate trading constraints.

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          Hedging and liquidation under transaction costs in currency markets

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            Local martingales and the fundamental asset pricing theorems in the discrete-time case

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              Robust hedging with proportional transaction costs

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                Author and article information

                Journal
                10 January 2018
                Article
                1801.03574
                e200c416-f25c-4018-8744-ccf043250d54

                http://arxiv.org/licenses/nonexclusive-distrib/1.0/

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                Custom metadata
                91B24, 60G42, 90C15
                q-fin.MF

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