解决Hempel统计模糊性问题与Causal AI

Solution of the Hempel's statistical ambiguity problem and Causal AI

精选理由

这篇论文用因果规则和MSCR证明解决了统计模糊性问题,理论扎实,适合想深入因果AI原理的人看。

AI 摘要

该论文针对Carl Hempel提出的归纳-统计推理中的统计模糊性问题,使用Nancy Cartwright的因果定义(概率提升)引入因果规则概念,定义了一种语义概率推理程序逐步精炼因果规则,得到最大特定因果关系(MSCR)。论文证明(Theorem 1)基于MSCR的预测是一致的,从而解决了统计模糊性问题。该语义概率推理程序可作为一种概率因果学习系统,用于因果AI和因果机器学习领域。

原文 · arXiv cs.AI

Solution of the Hempel's statistical ambiguity problem and Causal AI

This paper addresses Carl Hempel's longstanding problem of statistical ambiguity in inductive-statistical inference, in which contradictory predictions are derived from statistical laws. To avoid such predictions, Carl Hempel proposed the Requirement of Maximal Specificity (RMS) for the statistical laws used in the inference. An analysis of the RMS refinements made by Wesley Salmon, Alberto Coffa, and James Fetzer led to the following definition of maximally specific statistical laws: "the lawlike premises of an adequate explanation must specify all and only those properties whose presence or absence made a difference to the occurrence of its explanandum-phenomenon." However, there was no proof of a solution to the statistical ambiguity problem based on this definition. We use Nancy Cartwright's definition of causes that raise probabilities across background contexts, and then introduce the concept of Causal Rules. Then we define a special semantic probabilistic inference procedure that incrementally refines these causal rules by incorporating all statistically relevant information. This procedure yields Maximally Specific Causal Relationships (MSCRs), for which we prove (Theorem 1) that predictions derived from them are consistent. This resolves the statistical ambiguity problem. The semantic probabilistic inference procedure provides a probabilistic causal learning system, which may be used in such new areas as Causal AI and Causal Machine Learning. They fundamentally explore causal inference as a tool for understanding cause-and-effect relationships within complex systems. Properties similar to RMS remain under discussion. Several notions related to RMS are considered: invariant feature learning, invariant causal prediction, and spurious association.