Add to ORKGWe consider topological quantum computation (TQC) with a particular class of anyons that are believed to exist in the fractional quantum Hall effect state at Landau-level filling fraction v =5/2. Since the braid group representation describing the statistics of these anyons is not computationally universal, one cannot directly apply the standard TQC technique. We propose to use very noisy nontopological operations such as direct short-range interactions between anyons to simulate a universal set of gates. Assuming that all TQC operations are implemented perfectly, we prove that the threshold error rate for nontopological operations is above 14%. The total number of nontopological computational elements that one needs to simulate a quantum c...
Topological quantum computing seeks to store and manipulate information in a protected manner using ...
Topological quantum computers promise a fault tolerant means to perform quantum computation. Topolog...
We present a systematic numerical method to compute the elementary braiding operations for topologic...
The theory of quantum computation can be constructed from the abstract study of anyonic systems. In ...
Read-Rezayi fractional quantum Hall states are among the prime candidates for realizing non-Abelian ...
An obstacle affecting any proposal for a topological quantum computer based on Ising anyons is that ...
We present a constructive proof that anyonic magnetic charges with fluxes in a nonsolvable finite gr...
We study various aspects of the topological quantum computation scheme based on the non-Abelian anyo...
Two-dimensional systems such as quantum spin liquids or fractional quantum Hall systems exhibit anyo...
Anyons obtained from a finite gauge theory have a computational power that depends on the symmetry g...
A two-dimensional quantum system with anyonic excitations can be considered as a quantum computer. ...
A quantum computer can perform exponentially faster than its classical counterpart. It works on the ...
Topological quantum computation (TQC) is one of the most striking architectures that can realize fau...
The goal of this thesis is to examine some of the ways in which we might optimise the design of top...
The goal of this thesis is to examine some of the ways in which we might optimise the design of topo...
Topological quantum computing seeks to store and manipulate information in a protected manner using ...
Topological quantum computers promise a fault tolerant means to perform quantum computation. Topolog...
We present a systematic numerical method to compute the elementary braiding operations for topologic...
The theory of quantum computation can be constructed from the abstract study of anyonic systems. In ...
Read-Rezayi fractional quantum Hall states are among the prime candidates for realizing non-Abelian ...
An obstacle affecting any proposal for a topological quantum computer based on Ising anyons is that ...
We present a constructive proof that anyonic magnetic charges with fluxes in a nonsolvable finite gr...
We study various aspects of the topological quantum computation scheme based on the non-Abelian anyo...
Two-dimensional systems such as quantum spin liquids or fractional quantum Hall systems exhibit anyo...
Anyons obtained from a finite gauge theory have a computational power that depends on the symmetry g...
A two-dimensional quantum system with anyonic excitations can be considered as a quantum computer. ...
A quantum computer can perform exponentially faster than its classical counterpart. It works on the ...
Topological quantum computation (TQC) is one of the most striking architectures that can realize fau...
The goal of this thesis is to examine some of the ways in which we might optimise the design of top...
The goal of this thesis is to examine some of the ways in which we might optimise the design of topo...
Topological quantum computing seeks to store and manipulate information in a protected manner using ...
Topological quantum computers promise a fault tolerant means to perform quantum computation. Topolog...
We present a systematic numerical method to compute the elementary braiding operations for topologic...