TY - GEN
T1 - A Direct Reduction from the Polynomial to the Adversary Method
AU - Belovs, Aleksandrs
N1 - Publisher Copyright:
© Aleksandrs Belovs.
PY - 2024/9
Y1 - 2024/9
N2 - The polynomial and the adversary methods are the two main tools for proving lower bounds on query complexity of quantum algorithms. Both methods have found a large number of applications, some problems more suitable for one method, some for the other. It is known though that the adversary method, in its general negative-weighted version, is tight for bounded-error quantum algorithms, whereas the polynomial method is not. By the tightness of the former, for any polynomial lower bound, there ought to exist a corresponding adversary lower bound. However, direct reduction was not known. In this paper, we give a simple and direct reduction from the polynomial method (in the form of a dual polynomial) to the adversary method. This shows that any lower bound in the form of a dual polynomial is actually an adversary lower bound of a specific form.
AB - The polynomial and the adversary methods are the two main tools for proving lower bounds on query complexity of quantum algorithms. Both methods have found a large number of applications, some problems more suitable for one method, some for the other. It is known though that the adversary method, in its general negative-weighted version, is tight for bounded-error quantum algorithms, whereas the polynomial method is not. By the tightness of the former, for any polynomial lower bound, there ought to exist a corresponding adversary lower bound. However, direct reduction was not known. In this paper, we give a simple and direct reduction from the polynomial method (in the form of a dual polynomial) to the adversary method. This shows that any lower bound in the form of a dual polynomial is actually an adversary lower bound of a specific form.
KW - Quantum Adversary Bound
UR - https://drops.dagstuhl.de/storage/00lipics/lipics-vol310-tqc2024/LIPIcs.TQC.2024.11/LIPIcs.TQC.2024.11.pdf
UR - https://www.scopus.com/pages/publications/85203325332
U2 - 10.4230/LIPIcs.TQC.2024.11
DO - 10.4230/LIPIcs.TQC.2024.11
M3 - Conference paper
SN - 978-395977328-7
SN - 9783959773287
VL - 310
T3 - Leibniz International Proceedings in Informatics, LIPIcs
BT - 19th Conference on the Theory of Quantum Computation, Communication and Cryptography, TQC 2024
A2 - Magniez, Frederic
A2 - Grilo, Alex Bredariol
PB - Schloss Dagstuhl – Leibniz-Zentrum für Informatik
CY - Wadern
ER -