Quantum algorithms for hypergraph simplex finding

Abstract

We study the quantum query algorithms for simplex finding, a generalization of triangle finding to hypergraphs. This problem satisfies a rank-reduction property: a quantum query algorithm for finding simplices in rank-r hypergraphs can be turned into a faster algorithm for finding simplices in rank-(r-1) hypergraphs. We then show that every nested Johnson graph quantum walk (with any constant number of nested levels) can be converted into an adaptive learning graph. Then, we introduce the concept of α-symmetric learning graphs, which is a useful framework for designing and analyzing complex quantum search algorithms. Inspired by the work of Le Gall, Nishimura, and Tani (2016) on 3-simplex finding, we use our new technique to obtain an algorithm for 4-simplex finding in rank-4 hypergraphs with O(n2.46) quantum query cost, improving the trivial O(n2.5) algorithm.