6533b827fe1ef96bd1287024

RESEARCH PRODUCT

Weak Parity

Scott AaronsonAndris AmbainisKaspars BalodisMohammad Bavarian

subject

FOS: Computer and information sciencesComputer Science - Computational ComplexityQuantum PhysicsTheoryofComputation_GENERALFOS: Physical sciencesComputational Complexity (cs.CC)Quantum Physics (quant-ph)

description

We study the query complexity of Weak Parity: the problem of computing the parity of an n-bit input string, where one only has to succeed on a 1/2 + ε fraction of input strings, but must do so with high probability on those inputs where one does succeed. It is well-known that n randomized queries and n/2 quantum queries are needed to compute parity on all inputs. But surprisingly, we give a randomized algorithm for Weak Parity that makes only O(n/log[superscript 0.246](1/ε)) queries, as well as a quantum algorithm that makes O(n/√log(1/ε)) queries. We also prove a lower bound of Ω(n/log(1/ε)) in both cases, as well as lower bounds of Ω(logn) in the randomized case and Ω(√logn) in the quantum case for any ε > 0. We show that improving our lower bounds is intimately related to two longstanding open problems about Boolean functions: the Sensitivity Conjecture, and the relationships between query complexity and polynomial degree.

yearjournalcountryeditionlanguage
2013-11-29
https://dx.doi.org/10.48550/arxiv.1312.0036