A Game Theoretic Analysis of the Three-Gambler Ruin Game

Abstract

We study the following game. Three players start with initial capitals of s1,s2,s3 dollars; in each round player Pm is selected with probability 13; then he selects player Pn and they play a game in which Pm wins from (resp. loses to) Pn one dollar with probability pmn (resp. pnm=1-pmn). When a player loses all his capital he drops out; the game continues until a single player wins by collecting everybody's money. This is a "strategic" version of the classical Gambler's Ruin game. It seems reasonable that a player may improve his winning probability by judicious selection of which opponent to engage in each round. We formulate the situation as a stochastic game and prove that it has at least one Nash equilibrium in deterministic stationary strategies.