Topological Insulators: Dirac Equation in Condensed Matters: Springer Series in Solid-State Sciences, cartea 174
Autor Shun-Qing Shenen Limba Engleză Hardback – 11 ian 2013
This book is intended for researchers and graduate students working in the field of topological insulators and related areas.
Shun-Qing Shen is a Professor at the Department of Physics, the University of Hong Kong, China.
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Specificații
ISBN-13: 9783642328572
ISBN-10: 3642328571
Pagini: 240
Ilustrații: XIII, 225 p.
Dimensiuni: 155 x 235 x 19 mm
Greutate: 0.45 kg
Ediția:2013
Editura: Springer Berlin, Heidelberg
Colecția Springer
Seria Springer Series in Solid-State Sciences
Locul publicării:Berlin, Heidelberg, Germany
ISBN-10: 3642328571
Pagini: 240
Ilustrații: XIII, 225 p.
Dimensiuni: 155 x 235 x 19 mm
Greutate: 0.45 kg
Ediția:2013
Editura: Springer Berlin, Heidelberg
Colecția Springer
Seria Springer Series in Solid-State Sciences
Locul publicării:Berlin, Heidelberg, Germany
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Public țintă
ResearchCuprins
Introduction.- Starting from the Dirac equation.- Minimal lattice model for topological insulator.- Topological invariants.- Topological phases in one dimension.- Quantum spin Hall effect.- Three dimensional topological insulators.- Impurities and defects in topological insulators.- Topological superconductors and superfluids.- Majorana fermions in topological insulators.- Topological Anderson Insulator.- Summary: Symmetry and Topological Classification.
Recenzii
From the reviews:
“The book is devoted to the study of a large family of topological insulators and superconductors based on the solutions of the Dirac equation … . this book combines clear physical approaches and strict mathematics. It is very interesting from a methodical viewpoint for teaching the modern physics of condensed matters.” (I. A. Parinov, zbMATH, Vol. 1273, 2013)
“The book is devoted to the study of a large family of topological insulators and superconductors based on the solutions of the Dirac equation … . this book combines clear physical approaches and strict mathematics. It is very interesting from a methodical viewpoint for teaching the modern physics of condensed matters.” (I. A. Parinov, zbMATH, Vol. 1273, 2013)
Notă biografică
Professor Shun-Qing Shen, an expert in the field of condensed matter physics, is distinguished for his research works on spintronics of semiconductors, quantum magnetism and orbital physics in transition metal oxides, and novel quantum states of condensed matters. He proposed the theory of topological Anderson insulator, spin transverse force, resonant spin Hall effect and the theory of phase separation in colossal magnetoresistive (CMR) materials. He proved the existence of antiferromagnetic long-range order and off-diagonal long-range order in itinerant electron systems.
Professor Shun-Qing Shen has been a professor of physics at The University of Hong Kong since July 2007. Professor Shen received his BS, MS, and PhD in theoretical physics from Fudan University in Shanghai. He was a postdoctorial fellow (1992 – 1995) in China Center of Advanced Science and Technology (CCAST), Beijing, Alexander von Humboldt fellow (1995 – 1997) in Max Planck Institute for Physics of Complex Systems, Dresden, Germany, and JSPS research fellow (1997) in Tokyo Institute of Technology, Japan. In December 1997 he joined Department of Physics, The University of Hong Kong. He was awarded Croucher Senior Research Fellowship (Croucher Prize) in 2010.
Professor Shun-Qing Shen has been a professor of physics at The University of Hong Kong since July 2007. Professor Shen received his BS, MS, and PhD in theoretical physics from Fudan University in Shanghai. He was a postdoctorial fellow (1992 – 1995) in China Center of Advanced Science and Technology (CCAST), Beijing, Alexander von Humboldt fellow (1995 – 1997) in Max Planck Institute for Physics of Complex Systems, Dresden, Germany, and JSPS research fellow (1997) in Tokyo Institute of Technology, Japan. In December 1997 he joined Department of Physics, The University of Hong Kong. He was awarded Croucher Senior Research Fellowship (Croucher Prize) in 2010.
Textul de pe ultima copertă
Topological insulators are insulating in the bulk, but process metallic states around its boundary owing to the topological origin of the band structure. The metallic edge or surface states are immune to weak disorder or impurities, and robust against the deformation of the system geometry. This book, Topological insulators, presents a unified description of topological insulators from one to three dimensions based on the modified Dirac equation. A series of solutions of the bound states near the boundary are derived, and the existing conditions of these solutions are described. Topological invariants and their applications to a variety of systems from one-dimensional polyacetalene, to two-dimensional quantum spin Hall effect and p-wave superconductors, and three-dimensional topological insulators and superconductors or superfluids are introduced, helping readers to better understand this fascinating new field.
This book is intended for researchers and graduate students working in the field of topological insulators and related areas.
Shun-Qing Shen is a Professor at the Department of Physics, the University of Hong Kong, China.
This book is intended for researchers and graduate students working in the field of topological insulators and related areas.
Shun-Qing Shen is a Professor at the Department of Physics, the University of Hong Kong, China.
Caracteristici
Describes the hot newly discovered materials Presents a unified description of topological insulators from one to three dimensions based on the modified Dirac equation A starting point to enter the new research field-topological insulators
Descriere
Descriere de la o altă ediție sau format:
The first of its kind on the topic, this book presents a unified description of topological insulators in one, two and three dimensions based on the modified Dirac equation. Discusses topological invariants and their applications to a variety of systems.
The first of its kind on the topic, this book presents a unified description of topological insulators in one, two and three dimensions based on the modified Dirac equation. Discusses topological invariants and their applications to a variety of systems.