소장자료
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| 005 | 20250306172350▲ | ||
| 007 | ta ▲ | ||
| 008 | 240328s2024 enka b 001 0 eng c▲ | ||
| 010 | ▼a2024011919▲ | ||
| 020 | ▼a9781316511756▼q(hbk.)▲ | ||
| 020 | ▼a1009053779▼q(ebk.)▲ | ||
| 020 | ▼z9781009053778▼q(ebk.)▲ | ||
| 035 | ▼a(KERIS)REF000020531476▲ | ||
| 040 | ▼aDLC▼beng▼cDLC▼d221016▲ | ||
| 082 | 0 | 0 | ▼a537.6226▼223▲ |
| 090 | ▼a537.6226▼bB327q▲ | ||
| 100 | 1 | ▼aBasu, Saurabh.▲ | |
| 245 | 1 | 0 | ▼aQuantum Hall effect :▼bthe first topological insulator /▼cby Saurabh Basu.▲ |
| 264 | 1 | ▼aCambridge, United Kingdom ;▼aNew York, NY :▼bCambridge University Press,▼c2024.▲ | |
| 300 | ▼axvii, 222 p. :▼bill. ;▼c26 cm.▲ | ||
| 336 | ▼atext▼btxt▼2rdacontent▲ | ||
| 337 | ▼aunmediated▼bn▼2rdamedia▲ | ||
| 338 | ▼avolume▼bnc▼2rdacarrier▲ | ||
| 504 | ▼aIncludes bibliographical references and index.▲ | ||
| 520 | ▼a"The quantum Hall effect (QHE) is a fundamental phenomenon that occurs in a two-dimensional electron gas (2DEG) at low temperature and in the presence of a strong magnetic field. It has various applications in the fields like metrology and topological quantum computers. It also provides an extremely precise and independent determination of the fine-structure constant-a quantity of fundamental importance in quantum electrodynamics. This book attempts to present concepts of QHE to undergraduate and graduate students, post-doctoral researchers, and teachers taking advanced courses on condensed matter physics. The author has tried to integrate all the important concepts of QHE like graphene, the connection between topology and condensed matter physics, the prospects of next-generation storage devices based on the manipulation of spins (spintronic) and present them in a lucid manner. It offers the advantage of providing a pedagogical presentation to help students with some intermediate steps in derivation. The book starts with an introduction to the experimental discovery of the QHE that segues into the basics of 2DEG in a magnetic field. The physics of the Landau levels, their properties, and their relevance to the integer QHE are discussed. The importance of conduction and its connection to topological insulators is also emphasised. At a pedagogical level, concepts like linear response theory, Kubo formula, and topological invariance are explained and their relations to the understanding of QHE, graphene, its symmetries and its relevance as a quantum Hall insulator are also covered. It ends with an explanation of the role of interparticle interactions to explain fractional QHE with the help of topics such as the Laughlin wave function, fractional charge and statistics, and non-abelian anyons"--Provided by publisher.▲ | ||
| 650 | 0 | ▼aQuantum Hall effect.▲ | |
| 650 | 0 | ▼aElectron gas.▲ |
Quantum Hall effect : the first topological insulator
자료유형
국외단행본
서명/책임사항
Quantum Hall effect : the first topological insulator / by Saurabh Basu.
개인저자
형태사항
xvii, 222 p. : ill. ; 26 cm.
서지주기
Includes bibliographical references and index.
요약주기
"The quantum Hall effect (QHE) is a fundamental phenomenon that occurs in a two-dimensional electron gas (2DEG) at low temperature and in the presence of a strong magnetic field. It has various applications in the fields like metrology and topological quantum computers. It also provides an extremely precise and independent determination of the fine-structure constant-a quantity of fundamental importance in quantum electrodynamics. This book attempts to present concepts of QHE to undergraduate and graduate students, post-doctoral researchers, and teachers taking advanced courses on condensed matter physics. The author has tried to integrate all the important concepts of QHE like graphene, the connection between topology and condensed matter physics, the prospects of next-generation storage devices based on the manipulation of spins (spintronic) and present them in a lucid manner. It offers the advantage of providing a pedagogical presentation to help students with some intermediate steps in derivation. The book starts with an introduction to the experimental discovery of the QHE that segues into the basics of 2DEG in a magnetic field. The physics of the Landau levels, their properties, and their relevance to the integer QHE are discussed. The importance of conduction and its connection to topological insulators is also emphasised. At a pedagogical level, concepts like linear response theory, Kubo formula, and topological invariance are explained and their relations to the understanding of QHE, graphene, its symmetries and its relevance as a quantum Hall insulator are also covered. It ends with an explanation of the role of interparticle interactions to explain fractional QHE with the help of topics such as the Laughlin wave function, fractional charge and statistics, and non-abelian anyons"--Provided by publisher.
ISBN
9781316511756 1009053779
청구기호
537.6226 B327q
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