AbstractWe present two general methods for proving lower bounds on the query complexity of nonadaptive quantum algorithms. Both methods are based on the adversary method of Ambainis. We show that they yield optimal lower bounds for several natural problems, and we challenge the reader to determine the nonadaptive quantum query complexity of the “1-to-1 versus 2-to-1” problem and of Hidden Translation.In addition to the results presented at Wollic 2008 in the conference version of this paper, we show that the lower bound given by the second method is always at least as good (and sometimes better) as the lower bound given by the first method. We also compare these two quantum lower bounds to probabilistic lower bounds
We present a new variant of the quantum adversary method. All adversary methods give lower bounds on...
We prove tight Ω(n1/3) lower bounds on the quantum query complexity of the Collision and the Set Equ...
Computational complexity theory is usually phrased in terms of decision problems and Boolean functio...
International audienceWe present general methods for proving lower bounds on the query complexity of...
AbstractWe present two general methods for proving lower bounds on the query complexity of nonadapti...
The polynomial method and the adversary method are the two main techniques to prove lower bounds on ...
We propose a new method for proving lower bounds on quantum query algorithms. Instead of a classical...
The quantum adversary method is one of the most successful techniques for proving lower bounds on qu...
, Abstract. We prove a very general lower bound technique for quantum and randomized query complexit...
AbstractWe propose a new method for proving lower bounds on quantum query algorithms. Instead of a c...
We describe a method for upper bounding the quantum query complexity of certain boolean formula eval...
Quantum query complexity is known to be characterized by the so-called quantum adversary bound. Whil...
Thesis: Ph. D., Massachusetts Institute of Technology, Department of Physics, 2015.Cataloged from PD...
We give a new version of the adversary method for proving lower bounds on quantum query algorithms. ...
Shor's and Grover's famous quantum algorithms for factoring and searching show that quantum computer...
We present a new variant of the quantum adversary method. All adversary methods give lower bounds on...
We prove tight Ω(n1/3) lower bounds on the quantum query complexity of the Collision and the Set Equ...
Computational complexity theory is usually phrased in terms of decision problems and Boolean functio...
International audienceWe present general methods for proving lower bounds on the query complexity of...
AbstractWe present two general methods for proving lower bounds on the query complexity of nonadapti...
The polynomial method and the adversary method are the two main techniques to prove lower bounds on ...
We propose a new method for proving lower bounds on quantum query algorithms. Instead of a classical...
The quantum adversary method is one of the most successful techniques for proving lower bounds on qu...
, Abstract. We prove a very general lower bound technique for quantum and randomized query complexit...
AbstractWe propose a new method for proving lower bounds on quantum query algorithms. Instead of a c...
We describe a method for upper bounding the quantum query complexity of certain boolean formula eval...
Quantum query complexity is known to be characterized by the so-called quantum adversary bound. Whil...
Thesis: Ph. D., Massachusetts Institute of Technology, Department of Physics, 2015.Cataloged from PD...
We give a new version of the adversary method for proving lower bounds on quantum query algorithms. ...
Shor's and Grover's famous quantum algorithms for factoring and searching show that quantum computer...
We present a new variant of the quantum adversary method. All adversary methods give lower bounds on...
We prove tight Ω(n1/3) lower bounds on the quantum query complexity of the Collision and the Set Equ...
Computational complexity theory is usually phrased in terms of decision problems and Boolean functio...