Testing idealness in the filter oracle model

Abstract

A filter oracle for a clutter consists of a finite set V along with an oracle which, given any set X⊂eq V, decides in unit time whether or not X contains a member of the clutter. Let A2n be an algorithm that, given any clutter C over 2n elements via a filter oracle, decides whether or not C is ideal. We prove that in the worst case, A2n must make at least 2n calls to the filter oracle. Our proof uses the theory of cuboids.