cos 444 internet auctions: theory and practice
Post on 30-Dec-2015
25 Views
Preview:
DESCRIPTION
TRANSCRIPT
week 5 1
COS 444 Internet Auctions:
Theory and Practice
Spring 2009
Ken Steiglitz ken@cs.princeton.edu
week 5 2
week 5 3
Field Experiment“ Public Versus Secret Reserve Prices in eBay Auctions:
Results from a Pokémon Field Experiment,” R. Katkar & D. Lucking-Reiley, 1 December 5, 2000.
“We find that secret reserve prices make us worse off as sellers, by reducing the probability of the auction resulting in a sale, deterring serious bidders from entering the auction, and lowering the expected transaction price of the auction. We also present evidence that some sellers choose to use secret reserve prices for reasons other than increasing their expected auction prices.”
week 5 4
Pros and cons of secret reserve
Pros:• By comparison with equal open reserve, attracts
bidding activity, which is generally good because 1) more bidding attracts more bidders, 2) bidders fear “winner’s curse” less with more revealed information (more later, Milgrom & Weber 82),
and so bid higherCons:• Sends signal that price will be high, discourages
entry• Extra fee on eBay
week 5 5
Field Experiment… Katkar & L-R 00
• 50 matched pairs of Pokémon cards• 30% book value, open & secret reserve• Open reserve increased prob. sale: 72% vs.
52%• Open reserve yielded 8.5% more revenue• Caution: these are low-priced items!• Caution: is it reasonable to match equal secret
and open reserves? Is this the right question? Use low opening? Risk on high-value items ?
• Evidence of illicit transactions around eBay
week 5 6
Field Experiment… Katkar & L-R 00
Notice that they “… concluded with a notice that we intended to use data on bids for academic research, and provided contact information for questions or concerns.”
• Do you think this affected results?
week 5 7
All-Pay auction
• Here’s a different kind of auction: High bidder wins the item All bidders pay their bids! … the All-Pay Auction
• Models political campaigning, lobbying, bribery, evolution of offensive weapons like antlers,… etc.
• What’s your intuiton? How do you bid? Is this better or worse for the seller than first-price? Second-price?
week 5 8
All-pay equilibrium
Start with your value = v
E[surplus] = pr{1 wins} [ v ] – b ( v )
pay in any event
In value space, “bid as if your value = z”
E[surplus] = vF(z)n-1 – b(z)
And set derivative to zero at z=v.
week 5 9
All-pay equilbrium, con’t
• Differentiating and setting z=v:
0)()()()1( 2 vbvfvFvn n
• Integrating and using b(0)=0:
v nydFyvb0
1)()(
• Uniform-v case:
n
nv nv n vdyyyydvb n1
10
1
0
1 )1()()(
Note: once again, b΄ > 0, verifying monotonicity.
week 5 10
Expected rev. for uniform v’s of all-pay = FP = SP
• In all-pay auction, E[pay] = bid• Averaging over v for each bidder:
• Times n bidders:
• Same as SP, FP! More revenue equiv.!
1
1111
0 n
n
ndvnv
n
n
1
1E[revenue]
n
n
week 5 11
Related to all-pay: War of Attrition
Suppose two animals are willing to fight for a time (b1, b2). One gives up, the other wins. The price paid by the winner is
min (b1, b2).
Essentially a second-price all-pay: the winner pays second-highest bid, losers pay their bids.
week 5 12
Rev. equiv. FP=SP for general distributions
• In SP auctions, expected revenue = expected price paid = expected value of second-highest bid in equil.
1
0 2
1
0 22 )(1)(][ dxxGxdGxYERsp
In equil. means truthful bidding in SP auctions, of course.
week 5 13
Rev. equiv. FP=SP for general distributions
• In FP auctions, expected revenue = n E [payment of bidder 1 in equil.] = n E [bfp(v1 ) pr{1 wins} ]
1
0
1 )()()( vdFvFvbnR nfpfp
1
0
1
)(
)()(
n
v n
fp vF
ydFyvb
Now just plug in the known equil. bidding function:
week 5 14
Rev. equiv. FP=SP for general distributions
… and use integration by parts mercilessly, yielding
1
0
1
0
1 )1(1 dvFndvFn nn
spRdvG 1
0 21
1
0 0
1 )()(v n
fp vdFydFynR
week 5 15
Notice that this is also the revenue for general distributions in the all-pay auction
1
0 0
1 )()(v n
fp vdFydFynR
1
0)()( vdFvbn ap
week 5 16
Back to eBay: timing of bids
Pro sniping (strategic):• Avoids bidding wars• Avoids revealing expert information
(if you are an expert) [Roth & Ockenfels 02, Wilcox 00]
• Avoids being shadowed (possible?)• Possibly conceals your interest entirely• [Ockenfels & Roth 06] suggest implicit
collusion (a weak version of the prisoner’s dilemma)
week 5 17
[Roth & Ockenfels 02, Wilcox 00] Evidence from the field
Roth & Ockenfels: Computers vs. antiques
Wilcox: Power drills, etc. vs. pottery
• Bidding on collectibles later than bidding on
commodities• eBay bidding later than on Amazon (where deadline
is extensible)• Bidders with high feedback later than those with low
feedback on eBay
week 5 18
[Ockenfels & Roth 06] Argument pro sniping
• Suppose there is a significant chance of a snipe missing the deadline
• Then sniping can amount to “implicit collusion”, similar to an iterated prisoner’s dilemma
Depends on assumption of unreliable sniping (?, see eSnipe, eg)
week 5 19
[Ockenfels & Roth 06] Argument pro sniping
• Suppose two bidders, each misses deadline with prob. ½
• Each decides to bid truthfully
• Each decides to bid exactly once, either early or late (snipe)
• Each has private value = $21
• Starting bid = $1
week 5 20
[Ockenfels & Roth 06] Argument pro sniping
Game matrix, expected payoffs
5/510/0
0/100/0
late
early
lateearly
Defect
Cooperate
week 5 21
[Ockenfels & Roth 06] Argument pro sniping
Game matrix, expected payoffs
5/510/0
0/100/0
late
early
lateearly
An iterated Prisoner’s Dilemma!Actually, “Friend or Foe” game show because 0/0 is a weak equilibrium
See Axelrod, EvolutionOf Cooperation, BasicBooks, NY, 1984
week 5 22
Back to eBay: timing of bids
Pro sniping (nonstrategic):• Delays commitment• Or just procrastination• Soon-to-expire may be displayed first in
search• Willingness to pay increases with time --- “endowment effect” [Knetsch & Sniden
84, Kahneman, Knetsch, Thaler 90, Thaler 94]
week 5 23
Back to eBay: timing of bids
Anti sniping (strategic early bidding):
• Scares away competition
• Raising one’s own bid even scarier
• [Rasmusen 06] suggests cost of discovery leads to a collusive equilibrium
week 5 24
[Rasmusen 06]Argument pro early bidding
• Bidder 1 is uncertain of her value, can pay cost c to discover; bidder 2 is certain of his value
• 1 starts with low bid• 2 bids early to signal if his value is high• 1 pays to discover her value on signal• With carefully chosen c this is mutually beneficial --- an asymmetric equilibrium
Do you believe this?
week 5 25
Back to eBay: timing of bids
Anti sniping (nonstrategic early bidding):
• Allows you to sleep, eat, etc. (But sniping services and software solve this problem.)
• Psychological reward for being listed as high bidder
• Sniping may be perceived as underhanded, cowardly, unethical
top related