Funding Public goods with Lotteries: Experimental Evidence John Morgan; Martin Sefton Heriberto Gonzalez October, 2007.
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Funding Public goods with Lotteries: Experimental Evidence John Morgan; Martin Sefton
Heriberto GonzalezOctober, 2007
Outline
I. Introduction
II. Motivation
III. Theoretical Model
IV. Experimentsa. Penn State experiment
b. Iowa experiment
V. Results and Analysis’ Predictions
VI. Conclusions
I. Introduction
An effective means of raising funds through voluntary contributions is essential to provide public services
Charitable gambling is a significant revenue generating instrument
In Britain private charities raise 8% ( 500 millions) of their income through lotteries
In 1992, in the US about $6 billion was raised by private charities through lotteries.
II. Motivation
Will risk-neutral expected utility maximizers ever have an incentive to purchase lottery tickets with negative expected values?
How effective are lotteries in financing public goods?
When are lotteries more effective than other voluntary schemes for providing public goods?
II. Motivation
Morgan (2000) develops a model of equilibrium wagering in lotteries whose proceeds are used to finance public goods
We want to focus in three predictions of this model: the lottery provide (strictly) more of the public good than
direct solicitations public good provision increases with the size of the
lottery prize wagers vary with the return from the public good
III. Theory
Morgan (2000) introduces a theory of demand for lottery tickets.
Agents are risk-neutral expected utility maximizers with heterogeneous preferences and quasi-linear utility functions.
In equilibrium, the gamble is “unfair” The amount of public good provision depends upon the rate
of return from the public good and the size of the lottery prize
Ticket purchases more than cover the cost of awarding prizes iff public good provision is efficient
III. Theory: simple model
N
j jN
j j
iii Rx
x
xRxe
1
1
A linear homogeneous version of Morgan’s model N individuals; e endowments; R fixed prize The lottery is allowed to provide negative amounts of the
public good. is the constant marginal per capita return of public good
provision
If <1 and R=0 (VCM) => xi=0
If N>1 joint-payoffs are maximized at xi=e => VCM results in under-provision
With R>0 equilibrium wagers are positive Extreme free-riding does not constitute an equilibrium in the
lottery as it does in a VCM
III. Theory: simple model
12
1
1
N
j j
j j
x
xR
NN
NRRxG
N
i iL 1
1
1
2Re
N==>
N
GL is increasing in R
Taking limits a per capita payoff of lottery exceeds the per capita utility of e that is attained (in equilibria) under voluntary contributions
The introduction of lottery alleviates the free-rider problem but does not eliminate it.
III. Theory: simple model
Summarizing,
The model implies particular levels of wagering given group size, prize level, and
The model implies that wagers and public good provision increase with the size of the lottery prize
The model predicts that wagers and public good provision increase with
III. Theory: simple model
IV. Experiments: Penn State
Two sets of parallel sessions
In each set, one session used VCM and the other one LOT incentives
40 subjects were randomly allocated between two rooms
Two more sessions were conducted in parallel, using identical procedures but different subjects (checking replicability)
IV-a. Experiments: Penn State
Each session consisted of two phases Phase I: subjects were anonymously paired and played
a 10-stage game Phase II: subjects were rematched and played a single-
stage game against another anonymous partner
Decisions in phase I as well as phase II are considered independents
In each session, only possible communication between subjects is via their formal decisions
IV-a. Experiments: Penn State In every round subjects were endowed with 10 tokens
They had to divide between a private and group account
A token placed in the private account returned 100 points
A token placed in the group account returned 75 points to the subject and his partner
In the VCM treatment 8 tokens were placed directly in the group account yielding each subject 600 points
In the LOT treatment, 8 tokens worth of points provided a prize of 800 to the winner of the lottery
In this experiment were used two-person groups instead of 4 or more as usual in this kind of experiments
IV-a. Experiments: Penn State
PREDICTIONS
The Nash equilibrium calls for each subject to place either
0 tokens in the group account for VCM; or
8 tokens in the group account for LOT
IV-b. Experiments: Iowa Test the prediction that lotteries alleviate free-riding in a
more traditional public good environment
Eight sessions conducted in fall; each session 20 different subjects, visually isolated
Each session consisted of 20 rounds, first five of which were designated as a practice rounds
Subjects were randomly divided into four-person groups; they did not know who were in his group and the integrants in that group changed every round
Each subject were endowed with 20 tokens
IV-b. Experiments: Iowa At the end of the session one of rounds was chosen at random to
determine earnings
Subjects received 25 cents for every 50 points
Two sessions used the VCM treatment
A token placed in the private account yielded 100 points
A token placed in the group account yielded 75 points to everyone in the same group
In the VCM treatment subjects received 600 points every round
In the LOT treatment the lottery’s winner received 800 points
IV-b. Experiments: Iowa
Two sessions for the LOT treatment
In the LOT treatment the lottery’s winner received 800 points
To investigate the effect of size of prize two more identical sessions to LOT treatment were used; the new prize was 1600 points
To investigate the effect of linking lottery proceeds to public good provision two more identical sessions to LOT treatment were used; subjects received zero points from the group account
IV-b. Experiments: Iowa
PREDICTIONS
In theory, each subject should place
0 tokens in the group account for VCM
6 tokens in the group account for LOT
12 tokens in the group account for BIGLOT
1.5 tokens in the group account for BADLOT
V. Results The results from VCM sessions are similar to those from other
public good experiments
Figure 1 (Penn) and 2 (Iowa) reveals excessive contributions (relative to equilibrium) declining in later rounds
V. Results Despite that the equilibrium in the P-VCM treatment is supported
by dominant strategies, the equilibrium is a superior predictor of behavior in the P-LOT treatment
The average wagers in the I-LOT treatment do not converge to the Nash prediction, and in fact they remain excessive throughout both sessions.
V. Results By comparing LOT , for the BIGLOT the equilibrium is more
efficient
BADLOT is relatively efficient
V. Results
When the Nash equilibrium prediction is more efficient, as in the P-LOT, BIGLOT or BADLOT, average wagers conform to the prediction quite well.
When the prediction is less efficient, as in the I-LOT, there is excessive giving.
V. ResultsAveraging round by round,
LOT increase contributions LOT increase public good provision
V. Results Comparing round-by-round Iowa treatments
V. Results
We fail to reject the null hypothesis that the distributions are the same across sessions.
V. Results Figures 1-6 suggests that repetition has important effects in at least
some of the sessions
Wilcox matched-pairs test is used to determine whether the median contribution amounts vary across rounds in each of the treatments
V. Results
Mean final round contributions to the group account are close to theoretical predictions except in the VCM and I-LOT treatments.
V. Results
Agreement between actual and predicted contributions occurs when the equilibrium of the mechanism is relatively efficient, while actual contributions are excessive when the equilibrium is relatively inefficient.
V. Results When the public good is socially undesirable, contributions
are significantly reduced
VI. Conclusions When individuals account for he benefits from public good
provision it becomes rational for risk-neutral individuals to participate in such a lottery
For relatively efficient lotteries wagering behavior is well predicted by the theory, while for less efficient we observe excessive wagering
Despite excessive generosity in the VCM, lotteries increase the provision of the public good
Large prize lotteries will be more successful fund-raising devices than smaller scale endeavors
V. Results
When the equilibrium of the lottery is “relatively efficient”, average wagers are well predicted by the model
Lotteries with a relatively efficient equilibrium generate higher levels of public good provision than VCM
Lotteries are less successful in funding a socially undesirable public good
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