Quantum Lower Bound for Graph Collision Implies Lower Bound for Triangle Detection
Quantum Physics
2015-07-15 v1 Computational Complexity
Abstract
We show that an improvement to the best known quantum lower bound for GRAPH-COLLISION problem implies an improvement to the best known lower bound for TRIANGLE problem in the quantum query complexity model. In GRAPH-COLLISION we are given free access to a graph and access to a function as a black box. We are asked to determine if there exist , such that . In TRIANGLE we have a black box access to an adjacency matrix of a graph and we have to determine if the graph contains a triangle. For both of these problems the known lower bounds are trivial ( and , respectively) and there is no known matching upper bound.
Keywords
Cite
@article{arxiv.1507.03885,
title = {Quantum Lower Bound for Graph Collision Implies Lower Bound for Triangle Detection},
author = {Kaspars Balodis and Jānis Iraids},
journal= {arXiv preprint arXiv:1507.03885},
year = {2015}
}