Communication and cooperation in repeated games

Awaya, Yu; Krishna, Vijay

doi:10.3982/te3049

Cited by 22 publications

(12 citation statements)

References 35 publications

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“…Hereafter, we will briefly explain what a coarse correlated equilibrium is, and then how ε is determined. Precise arguments can be found in sections 2 and 4 of Awaya and Krishna ().…”

Section: Bound On Equilibrium Payoff Setmentioning

confidence: 91%

“…What happens in a more general case? Awaya and Krishna () construct an equilibrium that works with a general repeated game. When

ρ (p^{h}, p^{h}, p^{h})

is sufficiently big, the profit of each firm is arbitrarily close to the monopolist profit

π^{M}

.…”

Section: Exchange Of Firm‐specific Informationmentioning

confidence: 99%

“…For a fixed δ , ε is increasing in η and

\underset{η \to 0}{falselim} ϵ \to 0 .

Formal definition of monitoring quality involves total variation distance, and the interested reader can find this in section 2 of Awaya and Krishna (). The formula for log‐normal distribution is presented in section 3 of Awaya and Krishna ().…”

Section: Bound On Equilibrium Payoff Setmentioning

confidence: 99%

“…In Awaya and Krishna (), we show that exchange of aggregate sales data, which are deemed to be legal, can also be anti‐competitive. I also describe an upper bound of the set of equilibrium payoffs of a general repeated game, developed by Awaya and Krishna (), which plays a key role in understanding the effect of information exchange on firms’ profits.…”

Section: Introductionmentioning

confidence: 99%

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Collusion and Information Exchange

Awaya

2019

Jpn Econ Rev

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Antitrust authorities view that exchange of individual firms’ sales data is more anti‐competitive than that of aggregate sales data. In this paper, I survey antitrust implications of such inter‐firm information exchange. I argue that both types of information exchange are anti‐competitive under some circumstances. More precisely, I compare profits when each type of information exchange is allowed to that when firms can only observe their own sales (Stigler’s secret price‐cutting model), and the former is bigger than the latter. I also provide a general method to bound the equilibrium profits without such information exchange.

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“…Hereafter, we will briefly explain what a coarse correlated equilibrium is, and then how ε is determined. Precise arguments can be found in sections 2 and 4 of Awaya and Krishna ().…”

Section: Bound On Equilibrium Payoff Setmentioning

confidence: 91%

“…What happens in a more general case? Awaya and Krishna () construct an equilibrium that works with a general repeated game. When

ρ (p^{h}, p^{h}, p^{h})

is sufficiently big, the profit of each firm is arbitrarily close to the monopolist profit

π^{M}

.…”

Section: Exchange Of Firm‐specific Informationmentioning

confidence: 99%

“…For a fixed δ , ε is increasing in η and

\underset{η \to 0}{falselim} ϵ \to 0 .

Section: Bound On Equilibrium Payoff Setmentioning

confidence: 99%

Section: Introductionmentioning

confidence: 99%

See 2 more Smart Citations

Collusion and Information Exchange

Awaya

2019

Jpn Econ Rev

Self Cite

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“…] for all h t ∈ H t . By the law of total variance (e.g., Billingsley (1995), Problem 34.10(b)), we have…”

Section: Proof Of Theoremmentioning

confidence: 99%

Monitoring versus Discounting in Repeated Games

Sugaya,

Wolitzky

2023

ECTA

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We study how discounting and monitoring jointly determine whether cooperation is possible in repeated games with imperfect (public or private) monitoring. Our main result provides a simple bound on the strength of players' incentives as a function of discounting, monitoring precision, and on‐path payoff variance. We show that the bound is tight in the low‐discounting/low‐monitoring double limit, by establishing a public‐monitoring folk theorem where the discount factor and the monitoring structure can vary simultaneously.

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Equilibrium design in an n-player quadratic game

et al. 2022

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As in public good provisions, in a public bad situation such as abatement, the non-cooperative interplay of the participants typically results in low levels of quantities (provision or abatement). In a simple class of n-person quadratic games, we show how Coarse correlated equilibria, using simple mediation devices, can significantly outperform Nash equilibrium outcomes in terms of a stated policy objective.

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Communication and cooperation in repeated games

Cited by 22 publications

References 35 publications

Collusion and Information Exchange

Collusion and Information Exchange

Monitoring versus Discounting in Repeated Games

Equilibrium design in an n-player quadratic game

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