Araştırma Makalesi

Existence of almost fixed points for random operators with application in game theory

Cilt: 3 Sayı: 1 31 Mart 2020
Results in Nonlinear Analysis Kapak
Results in Nonlinear Analysis
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Existence of almost fixed points for random operators with application in game theory

Abstract

We introduce the notion of the random epsilon-fixed point for random operators. Then we prove some existence theorems in order to apply this results in game theory for example we will prove existence of epsilon-random Nash equilibrium in some class of random games. Such games can be applied in the environment in which Bayesian equilibria are considered, i.e. in games in which payoffs of players are known up to dependence on assignment of the players to specific types.

Keywords

Destekleyen Kurum

National Science Centre carried out at Warsaw University

Proje Numarası

DEC- 2016/21/B/HS4/00695

Teşekkür

The project was financed by funds of National Science Center granted by decision number DEC-2016/21/B/HS4/00695; carried out at Warsaw University.

Kaynakça

  1. [1] J.Andres, L.Górniewicz, 2012, Randomtopologicaldegreeandrandomdiferentialinclusions, TopologicalMethodsinNonlinearAnalysis 40(2), 330–358.
  2. [2] R. J. Aumann, 1974, Subjectivity and Correlation in Randomized Strate- gies, Journal of Mathematical Economics 1, 67–96.
  3. [3] T.Benavides, G.Acedo, H.Xu, 1996, Random fixed points of set-valued operators, Proceedings of the American Mathematical Society, 124(3), 831–838.
  4. [4] R.Branzei, J.Morgan, V.Scalzo, S.Tijs, 2003, Approximate fixed point theorems in Banach spaces with applications in game theory, J. Math. Anal. Appl. 619–628.
  5. [5] L.Górniewicz, 2006, Topological Fixed Point Theory of Multivalued Mappings, Springer.
  6. [6] O. Górniewicz, 2017, Note on The Fixed Point Property, Fixed Point Theory 18(1), 223–228.
  7. [7] O.Górniewicz, 2018, Random Nash Equilibrium, Fixed Point Theory 19(1), 219–224.
  8. [8] N.Papageorgiou, 1988, Random fixed points and random differential inclusions, International Journal of Mathematics and Mathematical Sciences 11(3), 551–560.

Ayrıntılar

Birincil Dil

İngilizce

Konular

Matematik

Bölüm

Araştırma Makalesi

Yazarlar

Yayımlanma Tarihi

31 Mart 2020

Gönderilme Tarihi

12 Şubat 2020

Kabul Tarihi

21 Mart 2020

Yayımlandığı Sayı

Yıl 2020 Cilt: 3 Sayı: 1

IZ

https://izlik.org/JA77CP64PY

Kaynak Göster

RIS / Bibtex
APA
Górniewicz, O. (2020). Existence of almost fixed points for random operators with application in game theory. Results in Nonlinear Analysis, 3(1), 18-23. https://izlik.org/JA77CP64PY
AMA
1.Górniewicz O. Existence of almost fixed points for random operators with application in game theory. RNA. 2020;3(1):18-23. https://izlik.org/JA77CP64PY
Chicago
Górniewicz, Oskar. 2020. “Existence of almost fixed points for random operators with application in game theory”. Results in Nonlinear Analysis 3 (1): 18-23. https://izlik.org/JA77CP64PY.
EndNote
Górniewicz O (01 Mart 2020) Existence of almost fixed points for random operators with application in game theory. Results in Nonlinear Analysis 3 1 18–23.
IEEE
[1]O. Górniewicz, “Existence of almost fixed points for random operators with application in game theory”, RNA, c. 3, sy 1, ss. 18–23, Mar. 2020, [çevrimiçi]. Erişim adresi: https://izlik.org/JA77CP64PY
ISNAD
Górniewicz, Oskar. “Existence of almost fixed points for random operators with application in game theory”. Results in Nonlinear Analysis 3/1 (01 Mart 2020): 18-23. https://izlik.org/JA77CP64PY.
JAMA
1.Górniewicz O. Existence of almost fixed points for random operators with application in game theory. RNA. 2020;3:18–23.
MLA
Górniewicz, Oskar. “Existence of almost fixed points for random operators with application in game theory”. Results in Nonlinear Analysis, c. 3, sy 1, Mart 2020, ss. 18-23, https://izlik.org/JA77CP64PY.
Vancouver
1.Oskar Górniewicz. Existence of almost fixed points for random operators with application in game theory. RNA [Internet]. 01 Mart 2020;3(1):18-23. Erişim adresi: https://izlik.org/JA77CP64PY