Linear Riley equilibria in quadratic signaling games
- Creators
- Weng, Xi1
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Wu, Fan2
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Yin, Xundong3
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1.
Peking University
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2.
California Institute of Technology
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3.
Central University of Finance and Economics
Abstract
We study signaling games with quadratic payoffs. As signaling games admit multiple separating equilibria, many equilibrium selection rules are proposed and a well-known solution is Riley equilibria. They are separating equilibria in which the sender achieves the highest equilibrium payoff for all types among all separating equilibria. We analyze the conditions for Riley equilibria to be linear, a common assumption in many applications. We derive a sufficient and necessary condition for the existence and uniqueness of linear Riley equilibria. We apply the result to confirm the dominance of linear equilibria in some classic examples, and we show that, in some other examples, there exist previously unknown nonlinear Riley equilibria.
Copyright and License
© 2023 Elsevier Inc. All rights reserved.
Supplemental Material
MMC. Negative discriminant quadratic games.
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Additional details
- National Natural Science Foundation of China
- 71973002
- National Natural Science Foundation of China
- 72192843
- National Natural Science Foundation of China
- 72225001
- Peking University
- University of California, Los Angeles
- Accepted
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2023-09-01Accepted
- Available
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2023-09-07Published online
- Available
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2023-09-14Version of Record online
- Caltech groups
- Division of the Humanities and Social Sciences (HSS)
- Publication Status
- Published