As we are entering the era of real-world small quantum computers, finding applications for these limited devices is a key challenge. In this vein, it was recently shown that a hybrid classical-quantum method can help provide polynomial speed-ups to classical divide-and-conquer algorithms, even when only given access to a quantum computer much smaller than the problem itself. In this work we study the hybrid divide-and-conquer method in the context of tree search algorithms, and extend it by including quantum backtracking, which allows better results than previous Grover-based methods. Further, we provide general criteria for polynomial speed-ups in the tree search context, and provide a number of examples where polynomial speed ups, using a...
Grover Search is currently one of the main quantum algorithms leading to hybrid quantumclassical met...
Quantum computing is a young but intriguing field of science. It combines quantum mechanics with inf...
Many problems that can be solved in quadratic time have bit-parallel speed-ups with factor w, where ...
As we are entering the era of real-world small quantum computers, finding applications for these lim...
Abstract. Traditional tree search algorithms supply a blueprint for modeling prob-lem solving behavi...
We describe a general method to obtain quantum speedups of classical algorithms which are based on t...
In this paper we will present a quantum algorithm which works very efficiently in case of multiple m...
In this article, we formulate and study quantum analogues of randomized search heuristics, which mak...
We give a quantum algorithm for evaluating a class of boolean formulas (such as NAND trees and 3-maj...
We introduce an algorithm for combinatorial search on quantum computers that is ca-pable of signican...
Mixed Integer Programs (MIPs) model many optimization problems of interest in Computer Science, Oper...
Quantum algorithms can deliver asymptotic speedups over their classical counterparts. However, there...
In this work we study Grover's algorithm for quantum computers. This algorithm promises to search in...
This thesis’ aim is to explore improvements to, and applications of, a fundamental quantum algorithm...
In this thesis, we aim to answer one research question: What is the algorithmic role of classical co...
Grover Search is currently one of the main quantum algorithms leading to hybrid quantumclassical met...
Quantum computing is a young but intriguing field of science. It combines quantum mechanics with inf...
Many problems that can be solved in quadratic time have bit-parallel speed-ups with factor w, where ...
As we are entering the era of real-world small quantum computers, finding applications for these lim...
Abstract. Traditional tree search algorithms supply a blueprint for modeling prob-lem solving behavi...
We describe a general method to obtain quantum speedups of classical algorithms which are based on t...
In this paper we will present a quantum algorithm which works very efficiently in case of multiple m...
In this article, we formulate and study quantum analogues of randomized search heuristics, which mak...
We give a quantum algorithm for evaluating a class of boolean formulas (such as NAND trees and 3-maj...
We introduce an algorithm for combinatorial search on quantum computers that is ca-pable of signican...
Mixed Integer Programs (MIPs) model many optimization problems of interest in Computer Science, Oper...
Quantum algorithms can deliver asymptotic speedups over their classical counterparts. However, there...
In this work we study Grover's algorithm for quantum computers. This algorithm promises to search in...
This thesis’ aim is to explore improvements to, and applications of, a fundamental quantum algorithm...
In this thesis, we aim to answer one research question: What is the algorithmic role of classical co...
Grover Search is currently one of the main quantum algorithms leading to hybrid quantumclassical met...
Quantum computing is a young but intriguing field of science. It combines quantum mechanics with inf...
Many problems that can be solved in quadratic time have bit-parallel speed-ups with factor w, where ...