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The reference interval in higher-order stochastic dominance

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  • Ruodu Wang
  • Qinyu Wu

Abstract

Given two random variables taking values in a bounded interval, we study whether one dominates the other in higher-order stochastic dominance depends on the reference interval in the model setting. We obtain two results. First, the stochastic dominance relations get strictly stronger when the reference interval shrinks if and only if the order of stochastic dominance is larger than three. Second, for mean-preserving stochastic dominance relations, the reference interval is irrelevant if and only if the difference between the degree of the stochastic dominance and the number of moments is no larger than three. These results highlight complications arising from using higher-order stochastic dominance in economic applications.

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  • Ruodu Wang & Qinyu Wu, 2024. "The reference interval in higher-order stochastic dominance," Papers 2411.15401, arXiv.org, revised Feb 2025.
    • Handle: RePEc:arx:papers:2411.15401
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    1. Ruodu Wang & Qinyu Wu, 2024. "Prudence and higher-order risk attitudes in the rank-dependent utility model," Papers 2412.15350, arXiv.org.

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