Topological quantum computation within the anyonic system the Kauffman-Jones version of \(SU(2)\) Chern-Simons theory at level 4
From MaRDI portal
Publication:291558
DOI10.1007/s11128-016-1249-4zbMath1338.81139arXiv1501.02841OpenAlexW2963820597MaRDI QIDQ291558
Publication date: 10 June 2016
Published in: Quantum Information Processing (Search for Journal in Brave)
Full work available at URL: https://arxiv.org/abs/1501.02841
braidsancilla preparationcomputational universality for \(n\)-qubit gatescomputational universality for 1-qutrit gatescontrolled NOT gatefusion measurementsinterferometric measurementsirrational qubit and qutrit phase gatesquantum computation with anyons
Related Items (3)
\(\ell_1\)-norm and entanglement in screening out braiding from Yang-Baxter equation associated with \(\mathbb{Z}_3\) parafermion ⋮ Topological quantum computation on supersymmetric spin chains ⋮ Protocol for making a 2-qutrit entangling gate in the Kauffman-Jones version of \(\mathrm{SU}(2)_4\)
Cites Work
- A new set of generators and a physical interpretation for the \(SU (3)\) finite subgroup \(D\)(9, 1, 1; 2, 1, 1)
- Knot theory and the Casson invariant in Artin presentation theory
- Interferometry of non-Abelian anyons
- Measurement-only topological quantum computation via anyonic interferometry
- Protocol for making a 2-qutrit entangling gate in the Kauffman-Jones version of \(\mathrm{SU}(2)_4\)
- Universal quantum computation with ideal Clifford gates and noisy ancillas
- Making a circulant 2-qubit entangling gate
- Temperley-Lieb Recoupling Theory and Invariants of 3-Manifolds (AM-134)
- Universal quantum computation with metaplectic anyons
- Interferometry versus projective measurement of anyons
- The Freedman group: a physical interpretation for theSU(3)-subgroupD(18, 1, 1; 2, 1, 1) of order 648
- Unnamed Item
- Unnamed Item
- Unnamed Item
This page was built for publication: Topological quantum computation within the anyonic system the Kauffman-Jones version of \(SU(2)\) Chern-Simons theory at level 4
