Optimal portfolio with vector expected utility |
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| Affiliation: | 1. Department of Information and Finance Management, National Taipei University of Technology, Taipei, Taiwan;2. Department of Finance, National United University, Miaoli, Taiwan;3. Department of Electrical Engineering, National Tsing Hua University, Hsinchu, Taiwan;4. School of Computer and Technology, Shandong University of Science and Technology, China |
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| Abstract: | ![]()
We study the optimal portfolio selected by an investor who conforms to Siniscalchi (2009)’s Vector Expected Utility’s (VEU) axioms and who is ambiguity averse. To this end, we derive a mean–variance preference generalised to ambiguity from the second-order Taylor–Young expansion of the VEU certainty equivalent. We apply this Mean–Variance Variability preference to the static two-assets portfolio problem and deduce asset allocation results which extend the mean–variance analysis to ambiguity in the VEU framework. Our criterion has attractive features: it is axiomatically well-founded and analytically tractable, it is therefore well suited for applications to asset pricing as proved by a novel analysis of the home-bias puzzle with two ambiguous assets. |
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