Bounded rationality is an important consideration stemming from the fact that agents often have limits on their processing abilities, making the assumption of perfect rationality inapplicable to many real tasks. We propose an information-theoretic approach to the inference of agent decisions under Smithian competition. The model explicitly captures the boundedness of agents (limited in their information-processing capacity) as the cost of information acquisition for expanding their prior beliefs. The expansion is measured as the Kullblack-Leibler divergence between posterior decisions and prior beliefs. When information acquisition is free, the homo economicus agent is recovered, while in cases when information acquisition becomes costly, agents instead revert to their prior beliefs. The maximum entropy principle is used to infer least-biased decisions based upon the notion of Smithian competition formalised within the Quantal Response Statistical Equilibrium framework. The incorporation of prior beliefs into such a framework allowed us to systematically explore the effects of prior beliefs on decision-making in the presence of market feedback, as well as importantly adding a temporal interpretation to the framework. We verified the proposed model using Australian housing market data, showing how the incorporation of prior knowledge alters the resulting agent decisions. Specifically, it allowed for the separation of past beliefs and utility maximisation behaviour of the agent as well as the analysis into the evolution of agent beliefs.
翻译:由于代理商的加工能力往往受到限制,使得完全合理性假设的假设不适用于许多实际任务,因此,合理性是一个重要的考虑因素。我们建议对史密斯竞争下的代理商决定的推断采取一种信息理论方法。模型明确反映了代理商(其信息处理能力有限)的界限,作为扩大其先前信仰的信息获取成本。扩展的衡量标准是Kullblack-Leeper在事后决定和先前信仰之间的差别。当信息获取自由时,同性经济代理商就会恢复,而在信息获取费用昂贵的情况下,同性经济代理商就会恢复其先前的信念。我们用最大通缩原则来推断基于Smithian竞争概念的最小偏差性决定,该概念在“卡通反应统计平衡”框架内正式确定。将先前的信念纳入这样一个框架,使我们能够系统地探讨先前的信念对决策的影响,同时在市场反馈中增加时间解释。我们用澳大利亚住房采购商的购买成本,而不是恢复其原先的信念。使用最大通缩原则来推断基于Smithian竞争概念的概念,在“卡通性反应统计平衡”框架内将先前的信念纳入过去的信念的演变,并允许将过去的商性信念纳入过去的理论,从而改变过去的推介的信念,从而将过去的信念转化为对过去的推介的推介商的信念的推入的推。