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 ...
Abstract: The quantum adversary method is one of the most versatile lower-bound meth-ods for quantum...
AbstractWe propose a new method for proving lower bounds on quantum query algorithms. Instead of a c...
We prove a characterization of quantum query algorithms in terms of polynomials satisfying a certain...
The polynomial method and the adversary method are the two main techniques to prove lower bounds on ...
The quantum adversary method is one of the most successful techniques for proving lower bounds on qu...
AbstractThe degree of a polynomial representing (or approximating) a function f is a lower bound for...
International audienceWe present general methods for proving lower bounds on the query complexity of...
Quantum query complexity measures the minimum number of queries a quantum algorithm needs to make to...
AbstractWe present two general methods for proving lower bounds on the query complexity of nonadapti...
While it is known that there is at most a polynomial separation between quantum query complexity and...
We present a new variant of the quantum adversary method. All adversary methods give lower bounds on...
We investigate query-to-communication lifting theorems for models related to the quantum adversary b...
We consider the number of quantum queries required to determine the coefficients of a degree-d polyn...
We prove a characterization of t-query quantum algorithms in terms of the unit ball of a space of de...
We propose a new method for proving lower bounds on quantum query algorithms. Instead of a classical...
Abstract: The quantum adversary method is one of the most versatile lower-bound meth-ods for quantum...
AbstractWe propose a new method for proving lower bounds on quantum query algorithms. Instead of a c...
We prove a characterization of quantum query algorithms in terms of polynomials satisfying a certain...
The polynomial method and the adversary method are the two main techniques to prove lower bounds on ...
The quantum adversary method is one of the most successful techniques for proving lower bounds on qu...
AbstractThe degree of a polynomial representing (or approximating) a function f is a lower bound for...
International audienceWe present general methods for proving lower bounds on the query complexity of...
Quantum query complexity measures the minimum number of queries a quantum algorithm needs to make to...
AbstractWe present two general methods for proving lower bounds on the query complexity of nonadapti...
While it is known that there is at most a polynomial separation between quantum query complexity and...
We present a new variant of the quantum adversary method. All adversary methods give lower bounds on...
We investigate query-to-communication lifting theorems for models related to the quantum adversary b...
We consider the number of quantum queries required to determine the coefficients of a degree-d polyn...
We prove a characterization of t-query quantum algorithms in terms of the unit ball of a space of de...
We propose a new method for proving lower bounds on quantum query algorithms. Instead of a classical...
Abstract: The quantum adversary method is one of the most versatile lower-bound meth-ods for quantum...
AbstractWe propose a new method for proving lower bounds on quantum query algorithms. Instead of a c...
We prove a characterization of quantum query algorithms in terms of polynomials satisfying a certain...