English

Braiding Operators are Universal Quantum Gates

Quantum Physics 2009-11-10 v4

Abstract

This paper explores of the role of unitary braiding operators in quantum computing. We show that a single specific solution R (the Bell basis change matrix) of the Yang-Baxter Equation is a universal gate for quantum computing, in the presence of local unitary transformations. We show that this same R generates a new non-trivial invariant of braids, knots, and links. Other solutions of the Yang-Baxter Equation are also shown to be universal for quantum computation. The paper discusses these results in the context of comparing quantum and topological points of view. In particular, we discuss quantum computation of link invariants, the relationship between quantum entanglement and topological entanglement, teleportation, and the structure of braiding in a topological quantum field theory.

Keywords

Cite

@article{arxiv.quant-ph/0401090,
  title  = {Braiding Operators are Universal Quantum Gates},
  author = {Louis H. Kauffman and Samuel J. Lomonaco},
  journal= {arXiv preprint arXiv:quant-ph/0401090},
  year   = {2009}
}

Comments

63 pages, LaTeX document, 23 figures