Download presentation
Presentation is loading. Please wait.
1
1 Utility Examples Scott Matthews Courses: 12-706 / 19-702
2
12-706 and 73-3592 Utility Functions We might care about utility function for wealth (earning money). Are typically: Upward sloping - want more. Concave (opens downward) - preferences for wealth are limited by your concern for risk. Not constant across all decisions! Risk-neutral (what is relation to EMV?) Risk-averse Risk-seeking
3
12-706 and 73-3593 Certainty Equivalent (CE) Amount of money you would trade equally in exchange for an uncertain lottery What can we infer in terms of CE about our stock investor? EU(low-risk) - his most preferred option maps to what on his utility function? Thus his CE must be what? EU(high-risk) -> what is his CE? We could use CE to rank his decision orders and get the exact same results.
4
12-706 and 73-3594 Risk Premium Is difference between EMV and CE. The risk premium is the amount you are willing to pay to avoid the risk (like an opportunity cost). Risk averse: Risk Premium >0 Risk-seeking: Premium < 0 (would have to pay them to give it up!) Risk-neutral: = 0.
5
12-706 and 73-3595 Utility Function Assessment Basically, requires comparison of lotteries with risk-less payoffs Different people -> different risk attitudes - > willing to accept different level of risk. Is a matter of subjective judgment, just like assessing subjective probability.
6
12-706 and 73-3596 Utility Function Assessment Two utility-Assessment approaches: Assessment using Certainty Equivalents Requires the decision maker to assess several certainty equivalents Assessment using Probabilities This approach use the probability-equivalent (PE) for assessment technique Exponential Utility Function: U(x) = 1-e -x/R R is called risk tolerance
7
7 We all need a break. Deal or No Deal http://www.nbc.com/Deal_or_No_Deal/game/
8
12-706 and 73-3598 Show online game - quickly Then play it in front of class a few times With index cards
9
12-706 and 73-3599 Professor’s Dream DOND is a constant tradeoff game: Certainty equivalent (banker’s offer) Expected value / utility of deal Attitude towards risk! Didn’t have this last year as example To accept a deal, CE must be < offer How does banker make offers? Not pure EV!
10
12-706 and 73-35910 Deal or No Deal - Decision Tree Decision node that has 2 options: Banker’s offer to stop the game OR Chance node (1/N equal probabilities) with all remaining case values as possible outcomes
11
12-706 and 73-35911 Let’s focus on a specific outcome You’ve been lucky, and have the game down to 2 cases: $1 and $1,000,000 What does your “decision tree” look like? How much would you have to be offered to stop playing? What are we asking when we say this? What if banker offers (offer increasingly bigger from about $100k).
12
12-706 and 73-35912 And what if your utility looks like.. Utility(Y) Money ($) $0 $1,000,000 1 0 EMV = $500,000.50 0.5 $220k CE - why? Typical risk-averse Risk Prem Risk Prem = EMV - CE
13
12-706 and 73-35913 The banker offers you $380,000 Who would take the offer? Who wouldn’t? Would the person on the previous slide take it? Why?
14
12-706 and 73-35914 And what if your utility looks like.. Utility(Y) Money ($) $0 $1,000,000 1 0 EMV = $500,000.50 0.5 CE - why? Typical risk-averse Risk Prem? Risk Prem = EMV - CE
15
12-706 and 73-35915 And what if your utility looks like.. Utility(Y) Money ($) $0 $1,000,000 1 0 EMV = $500,000.50 0.5 CE - why? Typical risk-seeking Risk Prem < 0! Risk Prem = EMV - CE ~0.15
16
12-706 and 73-35916 The banker’s utility function, and decision problem Minimizing loss!
17
17 Friedman-Savage Utility Or.. Why Scott doesn’t buy lottery tickets until the jackpots get big?
18
12-706 and 73-35918 http://www.gametheory.net/Mike/applets/Risk/ http://www.gametheory.net/Mike/applets/Risk/ http://www.nbc.com/Deal_or_No_Deal/game/flash.shtml http://www.nbc.com/Deal_or_No_Deal/game/flash.shtml http://www.srl.gatech.edu/education/ME88 13/Lectures/Lecture22_Multiattribute.pdf
Similar presentations
