We present the first calibration of quantum decision theory (QDT) to a dataset of binary risky choice. We quantitatively account for the fraction of choice reversals between two repetitions of the experiment, using a probabilistic choice formulation in the simplest form without model assumption or adjustable parameters. The prediction of choice reversal is then refined by introducing heterogeneity between decision makers through their differentiation into two groups: ``majoritarian'' and ``contrarian'' (in proportion 3:1). This supports the first fundamental tenet of QDT, which models choice as an inherent probabilistic process, where the probability of a prospect can be expressed as the sum of its utility and attraction factors. We propose to parameterise the utility factor with a stochastic version of cumulative prospect theory (logit-CPT), and the attraction factor with a constant absolute risk aversion (CARA) function. For this dataset, and penalising the larger number of QDT parameters via the Wilks test of nested hypotheses, the QDT model is found to perform significantly better than logit-CPT at both the aggregate and individual levels, and for all considered fit criteria for the first experiment iteration and for predictions (second ``out-of-sample'' iteration). The distinctive QDT effect captured by the attraction factor is mostly appreciable (i.e., most relevant and strongest in amplitude) for prospects with big losses. Our quantitative analysis of the experimental results supports the existence of an intrinsic limit of predictability, which is associated with the inherent probabilistic nature of choice. The results of the paper can find applications both in the prediction of choice of human decision makers as well as for organizing the operation of artificial intelligence.
翻译:我们第一次将量子决定理论(QDT)校准为二进制风险选择的数据集。 我们用数量来说明两次实验重复之间选择逆转的一小部分,使用一种最简单的概率选择公式,而没有模型假设或可调整参数。 然后,通过将决策者的偏差分为两类来改进对选择逆转的预测:“多数人”和“contrarian'(比例为3 :1 ) 。这支持QDT的第一个基本内在原则,该原则是作为内在概率过程的模型选择,其中一种前景的概率可以表现为其效用和吸引因素的总和和总和。我们提议,利用累积前景理论(logit-CPT)的精确版本,以及具有常数绝对风险转换功能的吸引因素。对于这个数据集,通过对最强的内联性假设测试来惩罚更大数量的QDT参数, QDT模型被认为比原始的概率过程要好得多, 其最精确的预测结果在总和单个的数值中, 与我们所认为的精确的预测值值值值的数值值值值值值值值值值值值值值的计算, 。</s>