Quantum Algorithms for the Triangle Problem

Abstract

We present two new quantum algorithms that either find a triangle (a copy of K3) in an undirected graph G on n nodes, or reject if G is triangle free. The first algorithm uses combinatorial ideas with Grover Search and makes O(n10/7) queries. The second algorithm uses O(n13/10) queries, and it is based on a design concept of Ambainis~amb04 that incorporates the benefits of quantum walks into Grover search~gro96. The first algorithm uses only O( n) qubits in its quantum subroutines, whereas the second one uses O(n) qubits. The Triangle Problem was first treated in~bdhhmsw01, where an algorithm with O(n+nm) query complexity was presented, where m is the number of edges of G.

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