In this paper, we give a description of a recent quantum algorithm created by Aharonov, Jones, and Landau for approximating the values of the Jones polynomial at roots of unity of the form exp(2$\pi$i/k). This description is given with two objectives in mind. The first is to describe the algorithm in such a way as to make explicit the underlying and inherent control structure. The second is to make this algorithm accessible to a larger audience
The Jones and HOMELY polynomials are link invariants with close connections to quantum computing. It...
In this section we introduce the Jones polynomial a link invariant found by Vaughan Jones in 1984. L...
Recently a quantum algorithm for the Jones polynomial of virtual links was proposed by Kauffman and ...
We analyze relationships between the Jones polynomial and quantum computation. Our first result is a...
analyze relationships between quantum computation and a family of generalizations of the Jones polyn...
analyze relationships between quantum computation and a family of generalizations of the Jones polyn...
analyze relationships between quantum computation and a family of generalizations of the Jones polyn...
We analyze the connections between the mathematical theory of knots and quantum physics by addressin...
We analyze relationships between quantum computation and a family of generalizations of the Jones po...
We describe a combinatorial framework for topological quantum computation, and illustrate a number ...
We describe a combinatorial framework for topological quantum computation, and illustrate a number ...
We construct a quantum algorithm to approximate efficiently the colored Jones polynomial of the plat...
It is one of the challenging problems to construct an efficient quantum algorithm which can compute ...
We provide an elementary introduction to topological quantum computation based on the Jones represen...
Topological quantum computers promise a fault tolerant means to perform quantum computation. Topolog...
The Jones and HOMELY polynomials are link invariants with close connections to quantum computing. It...
In this section we introduce the Jones polynomial a link invariant found by Vaughan Jones in 1984. L...
Recently a quantum algorithm for the Jones polynomial of virtual links was proposed by Kauffman and ...
We analyze relationships between the Jones polynomial and quantum computation. Our first result is a...
analyze relationships between quantum computation and a family of generalizations of the Jones polyn...
analyze relationships between quantum computation and a family of generalizations of the Jones polyn...
analyze relationships between quantum computation and a family of generalizations of the Jones polyn...
We analyze the connections between the mathematical theory of knots and quantum physics by addressin...
We analyze relationships between quantum computation and a family of generalizations of the Jones po...
We describe a combinatorial framework for topological quantum computation, and illustrate a number ...
We describe a combinatorial framework for topological quantum computation, and illustrate a number ...
We construct a quantum algorithm to approximate efficiently the colored Jones polynomial of the plat...
It is one of the challenging problems to construct an efficient quantum algorithm which can compute ...
We provide an elementary introduction to topological quantum computation based on the Jones represen...
Topological quantum computers promise a fault tolerant means to perform quantum computation. Topolog...
The Jones and HOMELY polynomials are link invariants with close connections to quantum computing. It...
In this section we introduce the Jones polynomial a link invariant found by Vaughan Jones in 1984. L...
Recently a quantum algorithm for the Jones polynomial of virtual links was proposed by Kauffman and ...
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