Quantum codes for topological quantum computation

This book offers a structured algebraic and geometric approach to the classification and construction of quantum codes for topological quantum computation. It combines key concepts in linear algebra, algebraic topology, hyperbolic geometry, group theory, quantum mechanics, and classical and quantum coding theory to help readers understand and develop quantum codes for topological quantum computation. One possible approach to building a quantum computer is based on surface codes, operated as stabilizer codes. The surface codes evolved from Kitaev's toric codes, as a means to developing models for topological order by using qubits distributed on the surface of a toroid. A significant advantage of surface codes is their relative tolerance to local errors. A second approach is based on color codes, which are topological stabilizer codes defined on a tessellation with geometrically local stabilizer generators. This book provides basic geometric concepts, like surface geometry, hyperbolic geometry and tessellation, as well as basic algebraic concepts, like stabilizer formalism, for the construction of the most promising classes of quantum error-correcting codes such as surfaces codes and color codes. The book is intended for senior undergraduate and graduate students in Electrical Engineering and Mathematics with an understanding of the basic concepts of linear algebra and quantum mechanics.

[preliminary]1 An Overview on Quantum Codes1.1 Previous Results1.2 Goals1.3 Some Classes of Quantum Error-Correcting Codes1.4 Quantum Error-Correcting Codes1.4.1 Formalism of Stabilizer Codes1.5 Topological Quantum Codes1.5.1 Topological Stabilizer Codes1.6 CSS Codes1.7 Surface Codes1.8 Toric Quantum Code, g = 11.9 Hyperbolic Surface Codes, g 21.10 Color Codes 2 Preliminaries2.1 Upper Half-Plane Model2.2 Unit Open Disc Model2.3 Geometrical Properties in H2 and [Delta]2.4 Tessellations in Euclidean and Hyperbolic Planes 3 Surface Codes 293.1 Toric Codes, g = 13.2 Projective Plane Codes, g = 03.3 Homological Quantum Codes, g = 13.4 g-Toric Codes, g 2 4 Color Codes4.1 Quantum Color Codes4.2 Hyperbolic Color Codes4.3 Polygonal Color Codes