Question 1 Question 2
Problem Set 2
Help
The due date for this homework is Mon 3 Feb 2014 9:05 AM CET.
In accordance with the Coursera Honor Code, I (Dang Quang Vinh) certify that the answers here are my own work.
Question 1 Part 1. Implementing a Voting Mechanism
Consider a voting with 2 alternative outcomes (a, b). When designing a voting mechanism, the designer can NOT specify: The actions are voting over three choices (x, y, z). The mapping from votes to outcomes. The voting rule is a simple majority rule. Player 1 must prefer a.
Question 2 Part 1. Implementing a Voting Mechanism
Suppose the designer uses the following voting mechanism: each player submits one vote, vi ∈ a, b ,
and the winning alternative
w
by all players. For instance, if there are probability of
1 n
is uniformly randomly chosen from all votes submitted
n
players, each of their votes will be chosen with a
.
Do players have dominant strategies in this voting game? Yes No
Question 3 Part 1. Implementing a Voting Mechanism
Suppose the designer uses the following voting mechanism: each player submits one vote, vi ∈ a, b ,
and the winning alternative
w
by all players. For instance, if there are probability of
1 n
is uniformly randomly chosen from all votes submitted
n
players, each of their votes will be chosen with a
.
There exists a Bayes-Nash equilibrium in this voting game. Yes No
Question 4 Part 2: Impossibility of General, Dominant-Strategy Implementation
Consider the following mechanisms, in which one truthful reporting of preferences is NOT a dominant strategy? A voting with player 1 being the dictator. A buyer chooses between buying or not, when the price is fixed. A voting under Borda rule. None of the above.
Question 5 Part 3: Transferable Utility
Here is a game with 2 players, θ
= (θ1 , θ2 ).
Let the outcome be
o = (x, p) = ((x1 , x2 ), (p1 , p2 )) .Consider
the following 3 utilities:
(A)
ui (θ, o) = (x1 + x2 ) θi pi
(B)
ui (θ, o) = (x1 + x2 )(θ1 + θ2 ) − p1 − p2
(C)
ui (θ, o) = x1 x2 (θ1 + θ2 ) − pi
Which of the utilities is quasilinear preferences with transferable utility? A B C None
Question 6 Part 3: Transferable Utility
Here is a game with 2 players, θ
= (θ1 , θ2 ).
Let the outcome be
o = (x, p) = ((x1 , x2 ), (p1 , p2 )) .Consider
the following 3 utilities:
(A)
ui (θ, o) = (x1 + x2 ) θi pi
(B)
ui (θ, o) = (x1 + x2 )(θ1 + θ2 ) − p1 − p2
(C)
ui (θ, o) = x1 x2 (θ1 + θ2 ) − pi
Which of the utilities is quasilinear preferences with transferable utility and private values? A B C None
Question 7 Part 4: Mechanism Design as an Optimization Problem
Consider a voting with 3 players (1, 2, 3) and 2 alternatives (a, b). Each player has a strict preference, and prefers a or
b
with equal probabilities. Each player gets 5 if his/her top choice is
selected and 0 otherwise.
Consider the following 2 voting rules with transferable utility: in both cases, each player submits one vote
vi ∈ a, b
for
i ∈ 1, 2, 3.
(i) The winning alternative
w
is uniformly randomly chosen from the 3 votes submitted by the 3
players, and there is no transfer. (ii)
w
is chosen under the same rule as in (i). Players with
vi ≠ w
vi = w
pay 1, and players with
get 1.
For example under (ii), if player 1 prefers a , votes a and winning alternative, player 1 gets 5 because
a
w = v1 = a
wins, pays 1 because
is selected to be the
v1 = a ,
and thus gets a
net payoff 4.
Which voting rule(s) is truthful? Both (i) and (ii) Only (i) Only (ii) Neither
Question 8 Part 4: Mechanism Design as an Optimization Problem
Consider a voting with 3 players (1, 2, 3) and 2 alternatives (a, b). Each player has a strict preference, and prefers a or
b
with equal probabilities. Each player gets 5 if his/her top choice is
selected and 0 otherwise.
Consider the following 2 voting rules with transferable utility: in both cases, each player submits one vote
vi ∈ a, b
for
i ∈ 1, 2, 3.
(i) The winning alternative
w
is uniformly randomly chosen from the 3 votes submitted by the 3
players, and there is no transfer. (ii)
w
is chosen under the same rule as in (i). Players with
vi ≠ w
vi = w
pay 1, and players with
get 1.
For example under (ii), if player 1 prefers a , votes a and winning alternative, player 1 gets 5 because
a
w = v1 = a
wins, pays 1 because
is selected to be the
v1 = a ,
and thus gets a
net payoff 4.
Which voting rule(s) is efficient? Both (i) and (ii) Only (i) Only (ii) Neither
Question 9 Part 4: Mechanism Design as an Optimization Problem
Consider a voting with 3 players (1, 2, 3) and 2 alternatives (a, b). Each player has a strict preference, and prefers a or
b
with equal probabilities. Each player gets 5 if his/her top choice is
selected and 0 otherwise.
Consider the following 2 voting rules with transferable utility: in both cases, each player submits one vote
vi ∈ a, b
for
i ∈ 1, 2, 3.
(i) The winning alternative
w
is uniformly randomly chosen from the 3 votes submitted by the 3
players, and there is no transfer. (ii)
w
is chosen under the same rule as in (i). Players with
vi ≠ w
vi = w
pay 1, and players with
get 1.
For example under (ii), if player 1 prefers a , votes a and winning alternative, player 1 gets 5 because
a
w = v1 = a
wins, pays 1 because
is selected to be the
v1 = a ,
and thus gets a
net payoff 4.
Which voting rule(s) is budget balanced? Both (i) and (ii) Only (i) Only (ii) Neither
Question 10 Part 4: Mechanism Design as an Optimization Problem
Consider a voting with 3 players (1, 2, 3) and 2 alternatives (a, b). Each player has a strict preference, and prefers a or
b
with equal probabilities. Each player gets 5 if his/her top choice is
selected and 0 otherwise.
Consider the following 2 voting rules with transferable utility: in both cases, each player submits one vote
vi ∈ a, b
for
i ∈ 1, 2, 3.
(i) The winning alternative
w
is uniformly randomly chosen from the 3 votes submitted by the 3
players, and there is no transfer. (ii)
w
is chosen under the same rule as in (i). Players with
vi ≠ w
vi = w
pay 1, and players with
get 1.
For example under (ii), if player 1 prefers a , votes a and winning alternative, player 1 gets 5 because
a
wins, pays 1 because
net payoff 4.
Which voting rule(s) is ex interim individual rational? Both (i) and (ii) Only (i) Only (ii) Neither
w = v1 = a
is selected to be the
v1 = a ,
and thus gets a
Question 11 Part 4: Mechanism Design as an Optimization Problem
Consider a voting with 3 players (1, 2, 3) and 2 alternatives (a, b). Each player has a strict preference, and prefers a or
b
with equal probabilities. Each player gets 5 if his/her top choice is
selected and 0 otherwise.
Consider the following 2 voting rules with transferable utility: in both cases, each player submits one vote
vi ∈ a, b
for
i ∈ 1, 2, 3.
(i) The winning alternative
w
is uniformly randomly chosen from the 3 votes submitted by the 3
players, and there is no transfer. (ii)
w
is chosen under the same rule as in (i). Players with
vi ≠ w
vi = w
pay 1, and players with
get 1.
For example under (ii), if player 1 prefers a , votes a and winning alternative, player 1 gets 5 because
a
w = v1 = a
wins, pays 1 because
is selected to be the
v1 = a ,
and thus gets a
net payoff 4.
Which voting rule earns a higher revenue? (i) (ii) Their Revenues are the same
Question 12 Part 4: Mechanism Design as an Optimization Problem
Consider a voting with 3 players (1, 2, 3) and 2 alternatives (a, b). Each player has a strict preference, and prefers a or
b
with equal probabilities. Each player gets 5 if his/her top choice is
selected and 0 otherwise.
Consider the following 2 voting rules with transferable utility: in both cases, each player submits one vote
vi ∈ a, b
for
i ∈ 1, 2, 3.
(i) The winning alternative
w
is uniformly randomly chosen from the 3 votes submitted by the 3
players, and there is no transfer. (ii)
w
is chosen under the same rule as in (i). Players with
vi ≠ w
vi = w
pay 1, and players with
get 1.
For example under (ii), if player 1 prefers a , votes a and winning alternative, player 1 gets 5 because
a
w = v1 = a
wins, pays 1 because
is selected to be the
v1 = a ,
and thus gets a
net payoff 4.
Which voting rule gives a higher maxmin fairness? (i) (ii) Their maxmin fairnesses are the same
In accordance with the Coursera Honor Code, I (Dang Quang Vinh) certify that the answers here are my own work.
Submit Answers
Save Answers
You cannot submit your work until you agree to the Honor Code. Thanks!
Help
The due date for this homework is Mon 3 Feb 2014 9:05 AM CET.
In accordance with the Coursera Honor Code, I (Dang Quang Vinh) certify that the answers here are my own work.
Question 1 Part 1. Implementing a Voting Mechanism
Consider a voting with 2 alternative outcomes (a, b). When designing a voting mechanism, the designer can NOT specify: The actions are voting over three choices (x, y, z). The mapping from votes to outcomes. The voting rule is a simple majority rule. Player 1 must prefer a.
Question 2 Part 1. Implementing a Voting Mechanism
Suppose the designer uses the following voting mechanism: each player submits one vote, vi ∈ a, b ,
and the winning alternative
w
by all players. For instance, if there are probability of
1 n
is uniformly randomly chosen from all votes submitted
n
players, each of their votes will be chosen with a
.
Do players have dominant strategies in this voting game? Yes No
Question 3 Part 1. Implementing a Voting Mechanism
Suppose the designer uses the following voting mechanism: each player submits one vote, vi ∈ a, b ,
and the winning alternative
w
by all players. For instance, if there are probability of
1 n
is uniformly randomly chosen from all votes submitted
n
players, each of their votes will be chosen with a
.
There exists a Bayes-Nash equilibrium in this voting game. Yes No
Question 4 Part 2: Impossibility of General, Dominant-Strategy Implementation
Consider the following mechanisms, in which one truthful reporting of preferences is NOT a dominant strategy? A voting with player 1 being the dictator. A buyer chooses between buying or not, when the price is fixed. A voting under Borda rule. None of the above.
Question 5 Part 3: Transferable Utility
Here is a game with 2 players, θ
= (θ1 , θ2 ).
Let the outcome be
o = (x, p) = ((x1 , x2 ), (p1 , p2 )) .Consider
the following 3 utilities:
(A)
ui (θ, o) = (x1 + x2 ) θi pi
(B)
ui (θ, o) = (x1 + x2 )(θ1 + θ2 ) − p1 − p2
(C)
ui (θ, o) = x1 x2 (θ1 + θ2 ) − pi
Which of the utilities is quasilinear preferences with transferable utility? A B C None
Question 6 Part 3: Transferable Utility
Here is a game with 2 players, θ
= (θ1 , θ2 ).
Let the outcome be
o = (x, p) = ((x1 , x2 ), (p1 , p2 )) .Consider
the following 3 utilities:
(A)
ui (θ, o) = (x1 + x2 ) θi pi
(B)
ui (θ, o) = (x1 + x2 )(θ1 + θ2 ) − p1 − p2
(C)
ui (θ, o) = x1 x2 (θ1 + θ2 ) − pi
Which of the utilities is quasilinear preferences with transferable utility and private values? A B C None
Question 7 Part 4: Mechanism Design as an Optimization Problem
Consider a voting with 3 players (1, 2, 3) and 2 alternatives (a, b). Each player has a strict preference, and prefers a or
b
with equal probabilities. Each player gets 5 if his/her top choice is
selected and 0 otherwise.
Consider the following 2 voting rules with transferable utility: in both cases, each player submits one vote
vi ∈ a, b
for
i ∈ 1, 2, 3.
(i) The winning alternative
w
is uniformly randomly chosen from the 3 votes submitted by the 3
players, and there is no transfer. (ii)
w
is chosen under the same rule as in (i). Players with
vi ≠ w
vi = w
pay 1, and players with
get 1.
For example under (ii), if player 1 prefers a , votes a and winning alternative, player 1 gets 5 because
a
w = v1 = a
wins, pays 1 because
is selected to be the
v1 = a ,
and thus gets a
net payoff 4.
Which voting rule(s) is truthful? Both (i) and (ii) Only (i) Only (ii) Neither
Question 8 Part 4: Mechanism Design as an Optimization Problem
Consider a voting with 3 players (1, 2, 3) and 2 alternatives (a, b). Each player has a strict preference, and prefers a or
b
with equal probabilities. Each player gets 5 if his/her top choice is
selected and 0 otherwise.
Consider the following 2 voting rules with transferable utility: in both cases, each player submits one vote
vi ∈ a, b
for
i ∈ 1, 2, 3.
(i) The winning alternative
w
is uniformly randomly chosen from the 3 votes submitted by the 3
players, and there is no transfer. (ii)
w
is chosen under the same rule as in (i). Players with
vi ≠ w
vi = w
pay 1, and players with
get 1.
For example under (ii), if player 1 prefers a , votes a and winning alternative, player 1 gets 5 because
a
w = v1 = a
wins, pays 1 because
is selected to be the
v1 = a ,
and thus gets a
net payoff 4.
Which voting rule(s) is efficient? Both (i) and (ii) Only (i) Only (ii) Neither
Question 9 Part 4: Mechanism Design as an Optimization Problem
Consider a voting with 3 players (1, 2, 3) and 2 alternatives (a, b). Each player has a strict preference, and prefers a or
b
with equal probabilities. Each player gets 5 if his/her top choice is
selected and 0 otherwise.
Consider the following 2 voting rules with transferable utility: in both cases, each player submits one vote
vi ∈ a, b
for
i ∈ 1, 2, 3.
(i) The winning alternative
w
is uniformly randomly chosen from the 3 votes submitted by the 3
players, and there is no transfer. (ii)
w
is chosen under the same rule as in (i). Players with
vi ≠ w
vi = w
pay 1, and players with
get 1.
For example under (ii), if player 1 prefers a , votes a and winning alternative, player 1 gets 5 because
a
w = v1 = a
wins, pays 1 because
is selected to be the
v1 = a ,
and thus gets a
net payoff 4.
Which voting rule(s) is budget balanced? Both (i) and (ii) Only (i) Only (ii) Neither
Question 10 Part 4: Mechanism Design as an Optimization Problem
Consider a voting with 3 players (1, 2, 3) and 2 alternatives (a, b). Each player has a strict preference, and prefers a or
b
with equal probabilities. Each player gets 5 if his/her top choice is
selected and 0 otherwise.
Consider the following 2 voting rules with transferable utility: in both cases, each player submits one vote
vi ∈ a, b
for
i ∈ 1, 2, 3.
(i) The winning alternative
w
is uniformly randomly chosen from the 3 votes submitted by the 3
players, and there is no transfer. (ii)
w
is chosen under the same rule as in (i). Players with
vi ≠ w
vi = w
pay 1, and players with
get 1.
For example under (ii), if player 1 prefers a , votes a and winning alternative, player 1 gets 5 because
a
wins, pays 1 because
net payoff 4.
Which voting rule(s) is ex interim individual rational? Both (i) and (ii) Only (i) Only (ii) Neither
w = v1 = a
is selected to be the
v1 = a ,
and thus gets a
Question 11 Part 4: Mechanism Design as an Optimization Problem
Consider a voting with 3 players (1, 2, 3) and 2 alternatives (a, b). Each player has a strict preference, and prefers a or
b
with equal probabilities. Each player gets 5 if his/her top choice is
selected and 0 otherwise.
Consider the following 2 voting rules with transferable utility: in both cases, each player submits one vote
vi ∈ a, b
for
i ∈ 1, 2, 3.
(i) The winning alternative
w
is uniformly randomly chosen from the 3 votes submitted by the 3
players, and there is no transfer. (ii)
w
is chosen under the same rule as in (i). Players with
vi ≠ w
vi = w
pay 1, and players with
get 1.
For example under (ii), if player 1 prefers a , votes a and winning alternative, player 1 gets 5 because
a
w = v1 = a
wins, pays 1 because
is selected to be the
v1 = a ,
and thus gets a
net payoff 4.
Which voting rule earns a higher revenue? (i) (ii) Their Revenues are the same
Question 12 Part 4: Mechanism Design as an Optimization Problem
Consider a voting with 3 players (1, 2, 3) and 2 alternatives (a, b). Each player has a strict preference, and prefers a or
b
with equal probabilities. Each player gets 5 if his/her top choice is
selected and 0 otherwise.
Consider the following 2 voting rules with transferable utility: in both cases, each player submits one vote
vi ∈ a, b
for
i ∈ 1, 2, 3.
(i) The winning alternative
w
is uniformly randomly chosen from the 3 votes submitted by the 3
players, and there is no transfer. (ii)
w
is chosen under the same rule as in (i). Players with
vi ≠ w
vi = w
pay 1, and players with
get 1.
For example under (ii), if player 1 prefers a , votes a and winning alternative, player 1 gets 5 because
a
w = v1 = a
wins, pays 1 because
is selected to be the
v1 = a ,
and thus gets a
net payoff 4.
Which voting rule gives a higher maxmin fairness? (i) (ii) Their maxmin fairnesses are the same
In accordance with the Coursera Honor Code, I (Dang Quang Vinh) certify that the answers here are my own work.
Submit Answers
Save Answers
You cannot submit your work until you agree to the Honor Code. Thanks!
