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dc.contributor.author
Martins, David Pires Tavares
dc.contributor.supervisor
Schweizer, Martin
dc.contributor.supervisor
Czichowsky, Christoph
dc.contributor.supervisor
Larsson, Martin
dc.date.accessioned
2024-03-01T08:47:15Z
dc.date.available
2024-02-27T03:13:20Z
dc.date.available
2024-02-27T16:44:02Z
dc.date.available
2024-02-28T16:38:57Z
dc.date.available
2024-03-01T08:47:15Z
dc.date.issued
2023
dc.identifier.uri
http://hdl.handle.net/20.500.11850/661658
dc.identifier.doi
10.3929/ethz-b-000661658
dc.description.abstract
The first main topic of this thesis, considered in Chapters I and II, is the study of the mean-variance hedging problem in the rough Heston model. Rough volatility models have become quite popular recently, but the question of hedging in such models is still underexplored. Previous work has focused on perfect hedging in a complete market and on approximate hedging under the risk-neutral measure. We use instead a mean-variance hedging approach under the historical measure, which is more natural for the purposes of risk management. Because the rough volatility process is neither Markovian nor a semimartingale, the rough Heston model poses difficulties to classical techniques in stochastic optimal control. By using the affine structure of the model, we obtain explicit formulas for the optimal mean-variance hedging strategies for a wide class of European-type payoffs, including vanilla call and put options, that can be implemented in practice. We then use those results to find optimal semistatic trading strategies in the underlying asset and a basket of derivatives. The second part of the thesis, developed in Chapters III and IV, pertains to quadratic market equilibria in continuous time. Many classical results on the existence and uniqueness of Radner equilibria such as the capital asset pricing model (CAPM) require the assumption of a complete market. The study of equilibria in incomplete setups is more challenging due to the absence of Pareto optimality. We obtain an explicit equilibrium in an incomplete semimartingale setup with quadratic utilities by using the linearity properties of mean-variance hedging. We then extend our results to mean-variance preferences and find an explicit solution in the linear case. More generally, we show the stability of the mean-variance hedging problem with respect to the quadratic equilibrium price process by using a novel result on the stability of quadratic backward stochastic differential equations under a BMO condition on the stochastic driver and in a continuous filtration. This yields sufficient conditions for the existence of an equilibrium for general mean-variance utility functions via a fixed-point argument.
en_US
dc.format
application/pdf
en_US
dc.language.iso
en
en_US
dc.publisher
ETH Zurich
en_US
dc.rights.uri
http://rightsstatements.org/page/InC-NC/1.0/
dc.title
Aspects of quadratic utility: mean-variance hedging in rough volatility models, and CAPM-type equilibria
en_US
dc.type
Doctoral Thesis
dc.rights.license
In Copyright - Non-Commercial Use Permitted
dc.date.published
2024-03-01
ethz.size
367 p.
en_US
ethz.code.ddc
DDC - DDC::5 - Science::510 - Mathematics
en_US
ethz.code.ddc
DDC - DDC::3 - Social sciences::330 - Economics
en_US
ethz.identifier.diss
29897
en_US
ethz.publication.place
Zurich
en_US
ethz.publication.status
published
en_US
ethz.leitzahl
ETH Zürich::00002 - ETH Zürich::00012 - Lehre und Forschung::00007 - Departemente::02000 - Dep. Mathematik / Dep. of Mathematics::02003 - Mathematik Selbständige Professuren::03658 - Schweizer, Martin / Schweizer, Martin
en_US
ethz.date.deposited
2024-02-27T03:13:20Z
ethz.source
FORM
ethz.eth
yes
en_US
ethz.availability
Open access
en_US
ethz.rosetta.installDate
2024-03-01T08:47:17Z
ethz.rosetta.lastUpdated
2024-03-01T08:47:17Z
ethz.rosetta.versionExported
true
ethz.COinS
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