可测的大多数 / The Measurable Majority
1️⃣ 一句话总结
本文提出了一种基于“社会决策框架”的方法,用有限个选民的群体和特定联盟来定义严格多数,并证明了如何用可加性测度来表示这种多数判断的一致性,同时给出了一套推理逻辑,修正了经典的概率表示定理,并为严格多数规则提供了类似于梅定理的刻画。
arXiv 提交日期: 2026-06-22
Abstract - The Measurable Majority
This paper studies strict majority reasoning in finite electorates using so-called $\textit{social decision frames}$: finite sets of voters equipped with distinguished families of coalitions interpreted as those voting blocs evaluated to form a strict majority. A coherence criterion for qualitative majority judgments is identified and shown to give an exact characterization for representability of strict majorities by finitely additive measures. In addition, a minimal natural logic for reasoning about strict majorities is shown to be sound and complete. These developments motivate examination of associated combinatorial questions concerning incoherence in finite families of sets; partial results and a conjecture are given. Finally, the results of this paper are applied to correct a classical representation theorem for weak qualitative probability structures due to Patrick Suppes and to establish a May-type characterization for ordinary strict majority rule for social decision frames.
源自 arXiv: 2606.23853