Mathematics of Quantum Computation and Quantum Technology
Coordonnateurs : Kauffman Louis, Lomonaco Samuel J.
Research and development in the pioneering field of quantum computing involve just about every facet of science and engineering, including the significant areas of mathematics and physics. Based on the firm understanding that mathematics and physics are equal partners in the continuing study of quantum science, Mathematics of Quantum Computation and Quantum Technology explores the rapid mathematical advancements made in this field in recent years.
Novel Viewpoints on Numerous Aspects of Quantum Computing and Technology
Edited by a well-respected team of experts, this volume compiles contributions from specialists across various disciplines. It contains four main parts, beginning with topics in quantum computing that include quantum algorithms and hidden subgroups, quantum search, algorithmic complexity, and quantum simulation. The next section covers quantum technology, such as mathematical tools, quantum wave functions, superconducting quantum computing interference devices (SQUIDs), and optical quantum computing. The section on quantum information deals with error correction, cryptography, entanglement, and communication. The final part explores topological quantum computation, knot theory, category algebra, and logic.
The Tools You Need to Tackle the Next Generation of Quantum Technology
This book facilitates both the construction of a common quantum language and the development of interdisciplinary quantum techniques, which will aid efforts in the pursuit of the ultimate goal-a "real" scalable quantum computer.
Date de parution : 09-2007
15.6x23.4 cm
Date de parution : 09-2019
15.6x23.4 cm
Thèmes de Mathematics of Quantum Computation and Quantum Technology :
Mots-clés :
Temperley Lieb Algebra; CNOT Gate; Louis Kauffman; Topological Quantum Field Theory; quantum computers; Hilbert Space; quantum information; Entangled State; quantum technology; Quantum Algorithms; quantum simulation; Partial Transpose; SQUID; Completely Positive Map; categorical algebra; Quantum Codes; cryptography; Quantum Computation; nanotechnology; Quantum Teleportation; wave functions; Braid Group; quantum mechanics; Artin Braid Group; knot theory; Hadamard Gates; quantum topology; Bracket Polynomial; Quantum Gates; Θ2 Sin Θ2 Cos; Symmetric Monoidal Category; Newton Polygon; Jones Polynomial; Von Neumann Measurement; Frobenius Algebra; Grover’s Algorithm; Linear Optical Quantum Computing; EPR Correlation