Approximate utility

Philip H. Dybvig; Shu Li

doi:10.1016/j.frl.2024.106042

Approximate utility

Philip H. Dybvig, Shu Li

Research output: Contribution to journal › Article › peer-review

Abstract

Approximating arbitrage or a perfect hedge in a limit implies approximation in utility (formally, expected utilities are continuous in L²), if and only if the utility function is bounded above and below by quadratics. We characterize when some special utility functions are continuous for all random consumptions with a common lower bound. Only linear, quadratic, and, in some cases, translated SAHARA utilities are continuous if there is no lower bound. We also characterize when a utility function defined on a convex subset can be extended to an L²-continuous nondecreasing and concave utility function on all of R.

Original language	English
Article number	106042
Journal	Finance Research Letters
Volume	69
DOIs	https://doi.org/10.1016/j.frl.2024.106042
State	Published - Nov 2024

Keywords

Approximate utility
Properness
Quadratic utility
von Neumann-Morgenstern

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10.1016/j.frl.2024.106042

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AB - Approximating arbitrage or a perfect hedge in a limit implies approximation in utility (formally, expected utilities are continuous in L2), if and only if the utility function is bounded above and below by quadratics. We characterize when some special utility functions are continuous for all random consumptions with a common lower bound. Only linear, quadratic, and, in some cases, translated SAHARA utilities are continuous if there is no lower bound. We also characterize when a utility function defined on a convex subset can be extended to an L2-continuous nondecreasing and concave utility function on all of R.

KW - Approximate utility

KW - Properness

KW - Quadratic utility

KW - von Neumann-Morgenstern

UR - https://www.scopus.com/pages/publications/85203085934

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VL - 69

JO - Finance Research Letters

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ER -

Approximate utility

Abstract

Keywords

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