On the Hardness of Set Disjointness and Set Intersection with Bounded Universe

TL;DR

This paper establishes new conditional lower bounds for the SetDisjointness and SetIntersection problems when the universe size is bounded, impacting the understanding of their computational complexity.

Contribution

It introduces a novel framework for proving conditional hardness of these problems with bounded universe size, enhancing their applicability in complexity theory.

Findings

Proves conditional hardness for bounded universe variants.

Demonstrates applications exploiting limited universe size.

Provides a new approach for lower bounds in set problems.

Abstract

In the SetDisjointness problem, a collection of $m$ sets $S_1,S_2,...,S_m$ from some universe $U$ is preprocessed in order to answer queries on the emptiness of the intersection of some two query sets from the collection. In the SetIntersection variant, all the elements in the intersection of the query sets are required to be reported. These are two fundamental problems that were considered in several papers from both the upper bound and lower bound perspective. Several conditional lower bounds for these problems were proven for the tradeoff between preprocessing and query time or the tradeoff between space and query time. Moreover, there are several unconditional hardness results for these problems in some specific computational models. The fundamental nature of the SetDisjointness and SetIntersection problems makes them useful for proving the conditional hardness of other problems from various areas. However, the universe of the elements in the sets may be very large, which may cause the reduction to some other problems to be inefficient and therefore it is not useful for proving their conditional hardness. In this paper, we prove the conditional hardness of SetDisjointness and SetIntersection with bounded universe. This conditional hardness is shown for both the interplay between preprocessing and query time and the interplay between space and query time. Moreover, we present several applications of these new conditional lower bounds. These applications demonstrates the strength of our new conditional lower bounds as they exploit the limited universe size. We believe that this new framework of conditional lower bounds with bounded universe can be useful for further significant applications.