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Game Theory. Topic 4 Mixed Strategies. “I used to think I was indecisive – but now I’m not so sure.”. - Anonymous. Review. Predicting likely outcome of a game Sequential games Look forward and reason back Simultaneous games Look for simultaneous best replies
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Game Theory Topic 4Mixed Strategies “I used to think I was indecisive – but now I’m not so sure.” - Anonymous
Review • Predicting likely outcome of a game • Sequential games • Look forward and reason back • Simultaneous games • Look for simultaneous best replies • What if (seemingly) there are no equilibria?
Employee Monitoring • Employees can work hard or shirk • Salary: $100K unless caught shirking • Cost of effort: $50K • Managers can monitor or not • Value of employee output: $200K • Profit if employee doesn’t work: $0 • Cost of monitoring: $10K
Employee Monitoring Manager • Best replies do not correspond • No equilibrium in pure strategies • What do the players do?
Employee Monitoring • John Nash proved: • Every finite game has a Nash equilibrium • So, if there is no equilibrium in pure strategies, we have to allow for mixing or randomization
Mixed Strategies • Unreasonable predictors of one-time interaction • Reasonable predictors of long-term proportions
G O A L I E L R K I C K E R L R Soccer Penalty Kicks (Six Year Olds Version)
Soccer Penalty Kicks • There are no mutual best responses • Seemingly, no equilibria • How would you play this game? • What would you do if you know that the goalie jumps left 75% of the time?
Probabilistic Soccer • Allow the goalie to randomize • Suppose that the goalie jumps left p proportion of the time • What is the kicker’s best response? • If p=1, goalie always jumps left • we should kick right • If p=0, goalie always jumps right • we should kick left
Probabilistic Soccer (continued) • The kicker’s expected payoff is: • Kick left: - 1 x p + 1 x (1-p) = 1 – 2p • Kick right: 1 x p - 1 x (1-p) = 2p – 1 • should kick left if: p < ½ (1 – 2p > 2p – 1) • should kick right if: p > ½ • is indifferent if: p = ½ • What value of p is best for the goalie?
Probabilistic Soccer (continued) • Mixed strategies: • If opponent knows what I will do, I will always lose! • Randomizing just right takes away any ability for the opponent to take advantage • If opponent has a preference for a particular action, that would mean that they had chosen the worst course from your perspective. • Make opponent indifferent between her strategies
Mixed Strategies • Strange Implications • A player chooses his strategy so as to make her opponent indifferent • If done right, the other player earns the same payoff from either of her strategies
Mixed Strategies COMMANDMENT Use the mixed strategy that keeps your opponents guessing.
Employee Monitoring Manager • Suppose: • Employee chooses (shirk, work) with probabilities (p,1-p) • Manager chooses (monitor, no monitor) with probabilities (q,1-q)
Keeping Employees from Shirking • First, find employee’s expected payoff from each pure strategy • If employee works: receives 50 • Profit(work) = 50 q + 50 (1-q) = 50 • If employee shirks: receives 0 or 100 • Profit(shirk) = 0 q + 100 (1-q) = 100 – 100q
Employee’s Best Response • Next, calculate the best strategy for possible strategies of the opponent • For q<1/2: SHIRK Profit(shirk) = 100-100q > 50 = Profit(work) • For q>1/2: WORK Profit(shirk) = 100-100q < 50 = Profit(work) • For q=1/2: INDIFFERENT Profit(shirk) = 100-100q = 50 = Profit(work)
Manager’s Equilibrium Strategy • Employees will shirk if q<1/2 • To keep employees from shirking, must monitor at least half of the time • Note: Our monitoring strategy was obtained by using employees’ payoffs
Manager’s Best Response • Monitor: 90 (1-p) - 10 p • No monitor: 100 (1-p) -100 p • For p<1/10:NO MONITOR monitor = 90-100p < 100-200p = no monitor • For p>1/10:MONITOR monitor = 90-100p > 100-200p = no monitor • For p=1/10:INDIFFERENT monitor = 90-100p = 100-200p = no monitor
Cycles 1 shirk p 1/10 work 0 0 1 1/2 no monitor q monitor
Mutual Best Responses 1 shirk p 1/10 work 0 0 1 1/2 no monitor q monitor
Solving Mixed Strategies • Seeming random is too important to be left to chance! • Determine the probability mix for each player that makes the other player indifferent between her strategies • Assign a probability to one strategy (e.g., p) • Assign remaining probability to other strategy • Calculate opponent’s expected payoff from each strategy • Set them equal
New Scenario • What if cost of monitoring were 50? Manager
New Scenario • To make employee indifferent:
Real Life? • Sports • Football • Tennis • Baseball • Law Enforcement • Traffic tickets • Price Discrimination • Airline stand-by policies • Policy compliance • Random drug testing
IRS Audits • 1997 • Offshore evasion compliance study • Calibrated random audits • 2002 IRS Commissioner Charles Rossotti: • Audits more expensive now than in ’97 • Number of audits decreased slightly • Offshore evasion alone increased to $70 billion dollars! • Recommendation: As audits get more expensive, need to increase budget to keep number of audits constant!
Law Enforcement • Motivate compliance at lower monitoring cost • Audits • Drug Testing • Parking • Should punishment fit the crime?
Football • You have a balanced offense • Equilibrium: • run half of the time • defend the run half of the time Defense
Football • You have a balanced offense • The run now works better than before What is the equilibrium? Defense
Effects of Payoff Changes • Direct Effect: • The player benefitted should take the better action more often • Strategic Effect: • Opponent defends against my better strategy more often, so I should take the action less often
Mixed Strategy Examples • Market entry • Stopping to help • All-pay auctions
Market Entry • N potential entrants into market • Profit from staying out: 10 • Profit from entry: 40 – 10 m • m is the number that enter • Symmetric mixed strategy equilibrium: • Earn 10 if stay out. Must earn 10 if enter!
Stopping to Help • N people pass a stranded motorist • Cost of helping is 1 • Benefit of helping is B > 1 • i.e., if you are the only one who could help, you would, since net benefit is B-1 > 0 • Symmetric Equilibria • p is the probability of stopping • Help: B-1 • Don’t help: B x chance someone stops
Stopping to Help (continued) • Don’t help: • B x chance someone stops = B x ( 1 – chance no one stops ) = B x ( 1 – (1-p)N-1 ) • Set help = Don’t help • B x ( 1 – (1-p)N-1 ) = B – 1 • p = 1 - (1/B)1/(N-1)
All-Pay Auctions • Players decide how much to spend • Expenditures are sunk • Biggest spender wins a prize worth V • How much would you spend?
Pure Strategy Equilibria? • Suppose rival spends s < V • Then you should spend just a drop higher • Then rival will also spend a drop higher • Suppose rival spends s ≥ V • Then you should spend 0 • Then rival should spend a drop over 0 • No equilibrium in pure strategies
Mixed Strategies • We need a probability of each amount • Use a distribution function F • F(s) is the probability of spending up to s • Imagine I spend s • Profit: V x Pr{win} – s = V x F(s) – s • ε
Mixed Strategies • For an equilibrium, I must be indifferent between all of my strategies V x F(s) – s = V x F(s’) – s’ for any s, s’ • What about s=0? • Probability of winning = 0 • So V x 0 – 0 = 0 • V x F(s) – s = 0 • F(s) = s/V
Mixed Strategies • F(s) = s/V on [0,V] • This implies that every amount between 0 and V is equally likely • Expected bid = V/2 • Expected payment = V • There is no economic surplus to firms competing in this auction
All-Pay Auctions • Patent races • Political contests • Wars of attrition • Lesson: With equally-matched opponents, all economic surplus is competed away • If running the competition: all-pay auctions are very attractive
Mixed Strategies in Tennis • Study: • Ten grand slam tennis finals • Coded serves as left or right • Determined who won each point • Found: • All serves have equal probability of winning • But: serves are not temporally independent
What Random Means • Study: • A fifteen percent chance of being stopped at an alcohol checkpoint will deter drinking and driving • Implementation • Set up checkpoints one day a week (1 / 7 ≈ 14%) • How about Fridays?
Exploitable Patterns CAVEAT Use the mixed strategy that keeps your opponents guessing. BUT Your probability of each action must be the same period to period.
Exploitable Patterns • Manager’s strategy of monitoring half of the time must mean that there is a 50% chance of being monitored every day! • Cannot just monitor every other day. • Humans are very bad at this. • Exploit patterns!
