Multi-Structural Games and Number of Quantifiers

Abstract

We study multi-structural games, played on two sets A and B of structures. These games generalize Ehrenfeucht-Fra\"iss\'e games. Whereas Ehrenfeucht-Fra\"iss\'e games capture the quantifier rank of a first-order sentence, multi-structural games capture the number of quantifiers, in the sense that Spoiler wins the r-round game if and only if there is a first-order sentence φ with at most r quantifiers, where every structure in A satisfies φ and no structure in B satisfies φ. We use these games to give a complete characterization of the number of quantifiers required to distinguish linear orders of different sizes, and develop machinery for analyzing structures beyond linear orders.