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Finance and Stochastics

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01-07-2013

Duality and convergence for binomial markets with friction

Authors: Yan Dolinsky, Halil Mete Soner

Published in: Finance and Stochastics | Issue 3/2013

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Abstract

We prove limit theorems for the super-replication cost of European options in a binomial model with friction. Examples covered are markets with proportional transaction costs and illiquid markets. A dual representation for the super-replication cost in these models is obtained and used to prove the limit theorems. In particular, the existence of a liquidity premium for the continuous-time limit of the model proposed in Çetin et al. (Finance Stoch. 8:311–341, 2004) is proved. Hence, this paper extends the previous convergence result of Gökay and Soner (Math Finance 22:250–276, 2012) to the general non-Markovian case. Moreover, the special case of small transaction costs yields, in the continuous limit, the G-expectation of Peng as earlier proved by Kusuoka (Ann. Appl. Probab. 5:198–221, 1995).

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Title: Duality and convergence for binomial markets with friction
Authors: Yan Dolinsky
Halil Mete Soner
Publication date: 01-07-2013
Publisher: Springer-Verlag
Published in: Finance and Stochastics / Issue 3/2013
Print ISSN: 0949-2984
Electronic ISSN: 1432-1122
DOI: https://doi.org/10.1007/s00780-012-0192-1

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