Skip to main content
Unpublished Paper
Computing Equilibria of N-Player Games with Arbitrary Accuracy,
Stanford Business School Research Paper #1984 (2008)
  • Srihari Govindan, University of Iowa
  • Robert B Wilson, Stanford University
Abstract

From a variant of Kuhn's triangulation we derive a discrete version of the Global Newton Method that yields an epsilon-equilibrium of an N-player game and then sequentially reduces epsilon toward zero to obtain any desired precision or the best precision for any number of iterations.

Keywords
  • game theory,
  • equilibria,
  • computation
Disciplines
Publication Date
February, 2008
Citation Information
Srihari Govindan and Robert B Wilson. "Computing Equilibria of N-Player Games with Arbitrary Accuracy," Stanford Business School Research Paper #1984 (2008)
Available at: http://works.bepress.com/wilson_robert/8/