Quotation Berger, Ulrich. 2012. Non-algebraic convergence proofs for continuous-time fictitious play. Dynamic Games and Applications 2 (1), 4-17.




In this technical note we use insights from the theory of projective geometry to provide novel and non-algebraic proofs of convergence of continuous-time fictitious play for a class of games. As a corollary we obtain a kind of equilibrium selection result, whereby continuous-time fictitious play converges to a particular equilibrium contained in a continuum of equivalent equilibria for symmetric 4x4 zero-sum games.


Press 'enter' for creating the tag

Publication's profile

Status of publication Published
Affiliation WU
Type of publication Journal article
Journal Dynamic Games and Applications
Citation Index SCI
WU-Journal-Rating new VW-C
Language English
Title Non-algebraic convergence proofs for continuous-time fictitious play
Volume 2
Number 1
Year 2012
Page from 4
Page to 17
Reviewed? Y
URL http://www.springerlink.com/content/d3g31156103821t1/
DOI http://dx.doi.org/10.1007/s13235-011-0033-4


Berger, Ulrich (Details)
Department of Economics (Berger) (Details)
Google Scholar: Search