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An elementary proof that integration preserves uppersemicontinuity

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  • Aumann, Robert J.

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  • Aumann, Robert J., 1976. "An elementary proof that integration preserves uppersemicontinuity," Journal of Mathematical Economics, Elsevier, vol. 3(1), pages 15-18, March.
  • Handle: RePEc:eee:mateco:v:3:y:1976:i:1:p:15-18
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    Cited by:

    1. Riascos Villegas, Alvaro & Torres-Martínez, Juan Pablo, 2013. "On pure strategy equilibria in large generalized games," MPRA Paper 46840, University Library of Munich, Germany.
    2. Mouhua Liao, 2019. "A Multi-Stage Market Game that Implements any Walrasian Allocation in any Pure-Exchange Environment," Working Papers 2019-07-03, Wang Yanan Institute for Studies in Economics (WISE), Xiamen University.
    3. Sofía Correa & Juan Pablo Torres-Martínez, 2016. "Large Multi-Objective Generalized Games: Existence and Essential Stability of Equilibria," Working Papers wp430, University of Chile, Department of Economics.
    4. Álvaro Riascos Villegas & Juan Pablo Torres-Martínez, 2010. "A Direct Proof of the Existence of Pure Strategy Equilibria in Large Generalized Games with Atomic Players," Documentos CEDE 007091, Universidad de los Andes - CEDE.
    5. Pedro Jara-Moroni, 2008. "Rationalizability in games with a continuum of players," Working Papers halshs-00587863, HAL.
    6. Khan, M. Ali & Rath, Kali P. & Sun, Yeneng, 1997. "On the Existence of Pure Strategy Equilibria in Games with a Continuum of Players," Journal of Economic Theory, Elsevier, vol. 76(1), pages 13-46, September.
    7. Lorenzo Rocco, 2001. "Nonatomic Games with Limited Anonymity," Working Papers 39, University of Milano-Bicocca, Department of Economics, revised Nov 2001.
    8. Büchel, Berno & Klößner, Stefan & Lochmüller, Martin & Rauhut, Heiko, 2018. "The Strength of Weak Leaders - An Experiment on Social Influence and Social Learning in Teams," ETA: Economic Theory and Applications 268729, Fondazione Eni Enrico Mattei (FEEM).
    9. Siemroth, Christoph, 2014. "Why prediction markets work : the role of information acquisition and endogenous weighting," Working Papers 14-29, University of Mannheim, Department of Economics.
    10. Riascos Villegas, Alvaro & Torres-Martínez, Juan Pablo, 2012. "On the existence of pure strategy equilibria in large generalized games with atomic players," MPRA Paper 36626, University Library of Munich, Germany.
    11. Chakrabarti, Subir K., 2003. "Pure strategy Markov equilibrium in stochastic games with a continuum of players," Journal of Mathematical Economics, Elsevier, vol. 39(7), pages 693-724, September.
    12. Camacho, Carmen & Kamihigashi, Takashi & Sağlam, Çağrı, 2018. "Robust comparative statics for non-monotone shocks in large aggregative games," Journal of Economic Theory, Elsevier, vol. 174(C), pages 288-299.
    13. Liao, Mouhua, 2016. "A market game with symmetric limit orders," Journal of Mathematical Economics, Elsevier, vol. 64(C), pages 66-76.
    14. Khan, M. Ali & Yeneng, Sun, 1995. "Pure strategies in games with private information," Journal of Mathematical Economics, Elsevier, vol. 24(7), pages 633-653.
    15. Jara-Moroni, Pedro, 2012. "Rationalizability in games with a continuum of players," Games and Economic Behavior, Elsevier, vol. 75(2), pages 668-684.
    16. Rath, Kali P., 1998. "Perfect and Proper Equilibria of Large Games," Games and Economic Behavior, Elsevier, vol. 22(2), pages 331-342, February.
    17. Duggan, John, 2017. "Existence of stationary bargaining equilibria," Games and Economic Behavior, Elsevier, vol. 102(C), pages 111-126.
    18. Lorenzo Rocco, 2007. "Anonymity in nonatomic games," International Review of Economics, Springer;Happiness Economics and Interpersonal Relations (HEIRS), vol. 54(2), pages 225-247, June.
    19. Haomiao Yu, 2012. "Point-Rationalizability in Large Games," Working Papers 030, Ryerson University, Department of Economics.

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