Existence and uniqueness of quadratic and linear mean-variance equilibria in general semimartingale markets

32 Pages Posted: 26 Aug 2024

See all articles by Martin Herdegen

Martin Herdegen

University of Warwick - Department of Statistics

Christoph Czichowsky

London School of Economics & Political Science (LSE) - Department of Mathematics

David Martins

ETH Zurich

Date Written: August 05, 2024

Abstract

We revisit the classical topic of quadratic and linear mean-variance equilibria with both financial and real assets. The novelty of our results is that they are the first allowing for equilibrium prices driven by general semimartingales and hold in discrete as well as continuous time. For agents with quadratic utility functions, we provide necessary and sufficient conditions for the existence and uniqueness of equilibria. We complement our analysis by providing explicit examples showing non-uniqueness or non-existence of equilibria. We then study the more difficult case of linear mean-variance preferences. We first show that under mild assumptions, a linear mean-variance equilibrium corresponds to a quadratic equilibrium (for different preference parameters). We then use this link to study a fixed-point problem that establishes existence (and uniqueness in a suitable class) of linear mean-variance equilibria. Our results rely on fine properties of dynamic mean-variance hedging in general semimartingale markets.

Suggested Citation

Herdegen, Martin and Czichowsky, Christoph and Martins, David, Existence and uniqueness of quadratic and linear mean-variance equilibria in general semimartingale markets (August 05, 2024). Available at SSRN: https://ssrn.com/abstract=4916235 or http://dx.doi.org/10.2139/ssrn.4916235

Martin Herdegen (Contact Author)

University of Warwick - Department of Statistics ( email )

Coventry CV4 7AL
United Kingdom

Christoph Czichowsky

London School of Economics & Political Science (LSE) - Department of Mathematics ( email )

Houghton Street
GB-London WC2A 2AE
United Kingdom

HOME PAGE: http://https://www.lse.ac.uk/Mathematics/people/Christoph-Czichowsky

David Martins

ETH Zurich ( email )

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