具有无界收益的非对称资源抽取博弈的一种特殊情况

IF 2.2 Q1 MATHEMATICS, APPLIED
I. Sylenko
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引用次数: 1

摘要

资源开采/资本积累博弈是一个随机的无限视界博弈,它模拟了一段时间内生产性资产的联合利用。本文对具有任意数量agent的非对称对策下纯马尔可夫完美均衡存在性的已有结果进行了补充。此外,我们允许参与者具有无界效用,并放宽了转移概率的随机核必须仅依赖于消耗前的资源量的假设。这类游戏没有事先检查过。然而,我们只能在特定情况下证明马尔可夫完美均衡的存在性。即,当参与者具有恒定的相对风险厌恶(CRRA)电力效用时,其过渡律与联合投资相关遵循几何随机游走。所选特征的设置是出于经济考虑,这使得它与一定范围的现实问题相关。
本文章由计算机程序翻译,如有差异,请以英文原文为准。
On a special case of non-symmetric resource extraction games with unbounded payoffs
The game of resource extraction/capital accumulation is a stochastic infinite-horizon game, which models a joint utilization of a productive asset over time. The paper complements the available results on pure Markov perfect equilibrium existence in the non-symmetric game setting with an arbitrary number of agents. Moreover, we allow that the players have unbounded utilities and relax the assumption that the stochastic kernels of the transition probability must depend only on the amount of resource before consumption. This class of the game has not been examined beforehand. However, we could prove the Markov perfect equilibrium existence only in the specific case of interest. Namely, when the players have constant relative risk aversion (CRRA) power utilities and the transition law follows a geometric random walk in relation to the joint investment. The setup with the chosen characteristics is motivated by economic considerations, which makes it relevant to a certain range of real-word problems.
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来源期刊
CiteScore
3.30
自引率
6.20%
发文量
13
审稿时长
16 weeks
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