The main results on quantum walk search are scattered over different, incomparable frameworks, most notably the hitting time framework, originally by Szegedy, the electric network framework by Belovs, and the MNRS framework by Magniez, Nayak, Roland and Santha. As a result, a number of pieces are currently missing. For instance, the electric network framework allows quantum walks to start from an arbitrary initial state, but it only detects marked elements. In recent work by Ambainis et al., this problem was resolved for the more restricted hitting time framework, in which quantum walks must start from the stationary distribution. We present a new quantum walk search framework that unifies and strengthens these frameworks. This leads to a n...
While the quantum query complexity of k-distinctness is known to be O(n3/4-1/4(2k-1)) for any consta...
Quantum walks are stochastic processes generated by a quantum evolution mechanism, allowing for spee...
We carry out a numerical study of the quantum walk search algorithm of Shenvi, Kempe and Whaley Shen...
The main results on quantum walk search are scattered over different, incomparable frameworks, most ...
Many quantum algorithms critically rely on quantum walk search, or the use of quantum walks to speed...
The revised edition of this book offers an extended overview of quantum walks and explains their rol...
We propose a new method for designing quantum search algorithms for finding a ``marked'' element in ...
We solve an open problem by constructing quantum walks that not only detect but also find marked ver...
Recently a number of discrete quantum walk based algorithms have been produced [1–6]. These are clos...
We give a quantum algorithm for finding a marked element on the grid when there are multiple marked ...
We propose a new framework for turning quantum search algorithms that decide into quantum algorithms...
We provide a new spatial search algorithm by continuous-time quantum walk which can find a marked no...
We introduce a new tool for quantum algorithms called quantum fast-forwarding (QFF). The tool uses q...
Continuous-time quantum walks provide a natural framework to tackle the fundamental problem of findi...
There has been a very large body of research on searching a marked vertex on a graph based on quantu...
While the quantum query complexity of k-distinctness is known to be O(n3/4-1/4(2k-1)) for any consta...
Quantum walks are stochastic processes generated by a quantum evolution mechanism, allowing for spee...
We carry out a numerical study of the quantum walk search algorithm of Shenvi, Kempe and Whaley Shen...
The main results on quantum walk search are scattered over different, incomparable frameworks, most ...
Many quantum algorithms critically rely on quantum walk search, or the use of quantum walks to speed...
The revised edition of this book offers an extended overview of quantum walks and explains their rol...
We propose a new method for designing quantum search algorithms for finding a ``marked'' element in ...
We solve an open problem by constructing quantum walks that not only detect but also find marked ver...
Recently a number of discrete quantum walk based algorithms have been produced [1–6]. These are clos...
We give a quantum algorithm for finding a marked element on the grid when there are multiple marked ...
We propose a new framework for turning quantum search algorithms that decide into quantum algorithms...
We provide a new spatial search algorithm by continuous-time quantum walk which can find a marked no...
We introduce a new tool for quantum algorithms called quantum fast-forwarding (QFF). The tool uses q...
Continuous-time quantum walks provide a natural framework to tackle the fundamental problem of findi...
There has been a very large body of research on searching a marked vertex on a graph based on quantu...
While the quantum query complexity of k-distinctness is known to be O(n3/4-1/4(2k-1)) for any consta...
Quantum walks are stochastic processes generated by a quantum evolution mechanism, allowing for spee...
We carry out a numerical study of the quantum walk search algorithm of Shenvi, Kempe and Whaley Shen...