Graphene, the quantum spin hall effect and topological insulators i. Hall effect article about hall effect by the free dictionary. Pdf quantum hall effect a brief introduction researchgate. Up to now, only one magnetically doped topological insulator, suffering from a small bulk band gap, is confirmed to host the qah effect experimentally. The quantum hall effect or integer quantum hall effect is a quantummechanical version of the hall effect, observed in twodimensional electron systems subjected to low temperatures and strong magnetic fields, in which the hall conductance. Girvin yale university sloane physics laboratory new haven, ct 06520 usa 1 introduction the quantum hall e ect qhe is one of the most remarkable condensedmatter phenomena discovered in the second half of the 20th century. In a black phosphorus fet, the gate induces highly anisotropic 2d electron and hole gases.
The effect of this local field is to multiply the matrix element for hop. In the year 1980, the quantum hall effect qhe was discovered by klaus. Numbers in parentheses indicate the years of each discovery. The conventional definition of the resistance of a conductor is the ratio of voltage applied across the conductor to the current passing through the conductor. We get a harmonic oscillator in the radial direction and a free particle in.
This is a course on the quantum hall effect, given in tifr, mumbai. Experimental observation of quantum hall effect and berrys phase in graphene by yuanbo zhang 2005 experimental observation of the quantum anomalous hall effect in a magnetic topological insulator by qikun xue, shoucheng zhang 20 attempts to extend haldane model to explain fractional quantum hall effect quantum spin hall effect. There are surprisingly few dedicated books on the quantum hall e. These lecture notes yield an introduction to quantum hall effects both for nonrelativistic electrons in conventional 2d electron gases such as in semiconductor heterostructures and relativistic electrons in graphene. The first four chapters require only basic quantum mechanics.
The fractional quantum hall effect, in particular, has opened up a new paradigm in the study of strongly correlated electrons, and it has been shown that new concepts, such as fractional statistics, anyon, chiral luttinger liquid and composite particles, are realized in twodimensional electron systems. Right the quantum anomalous hall effect has quantum hall features without an applied field. These results can be interpreted as a dynamical quantum hall effect in a parameter space. Model for a quantum hall effect without landau levels. The book offers important new insights into the fractional quantum hall effect in lowdimensional systems of humanmade quantum structures and discusses the quantum hall effect as both a theoretical method for the study of semiconductors and as a tool for physicists and electrical engineers working in the electronics industry. Graphenes exceptionally weak spinorbit couplingstemming from carbons low massposes the primary obstacle. Apr 24, 2012 these results can be interpreted as a dynamical quantum hall effect in a parameter space.
Abstract when exposed to a magnetic field b electrons will move in a direction per. Let me start with the definition of hall resistance to answer this question. The conventional quantum hall effect is a particular example of the general relation if one views the electric field as a rate of change of the vector potential. Realization of the quantum spin hall effect in graphene devices has remained an outstanding challenge dating back to the inception of the field of topological insulators. Perspectives in quantum hall effects wiley online books. View quantum hall effect research papers on academia. After a brief historical overview in chapter 1, we discuss in detail the kineticenergy quantisation of nonrelativistic and the relativistic electrons in a strong magnetic. The fundamental quantum of hall resistance is he2 25,8 in this lab we will only be concerned with the hall coefficient. Left the quantum hall effect qhe occurs in a twodimensional electron system under a large applied magnetic field. The quantum hall effect is referred to as the integer or fractional quantum hall effect depending on whether.
At charge neutrality, the ensuing ground state is a quantum hall ferromagnet with two filled states of identical spin polarization and an edge dispersion that exhibits two counterpropagating, spinfiltered helical edge channels fig. The integer quantum hall effect concerns the transport properties of a 2dimensional electron system in the. The unexpected discovery of the quantum hall effect was the result of basic research on silicon fieldeffect transistors combined with my experience in metrology, the science of measurements. The quantum hall effect has remained one of the most beautiful and outstanding experimental realizations of the instanton vacuum concept in nonlinear sigma models 1 2. Evidence for a quantum spin hall phase in graphene. The nature of this plateau is still a matter of debate, and active current research. For all three quantum hall effects, electrons flow through the lossless edge channels, with the rest of the system insulating. The hall effect is used today as a research tool to probe the movement of charges, their drift velocities and densities, and so on, in materials. If youre a seller, fulfillment by amazon can help you grow your business. Quantum hall effects comprise the integer quantum hall effect iqhe and the fractional quantum hall effect fqhe. The magnetic force is f m ev d b where v d is the drift velocity of the charge. Quantum hall effect, international journal of theoretical. Ppt the hall effect powerpoint presentation free to. The freeelectron quantum gas model still predicts a hall coefficient of 1nq.
Helical quantum hall phase in graphene on srtio3 science. Two prominent ones are prange and girvin, the quantum hall e. The quantum spin hall effect is a unique phase of matter in which the bulk of the material is an insulator, but topological quantum states exist at the. Field theoretical approach and related topics 2nd edition on free shipping on qualified orders. Although the 2d hole gas in black phosphorus has reached high carrier mobilities that led to the observation of the integer quantum hall effect, the. Experiments on topological insulator and quantum anomalous hall effect part i duration. The fillingfactor upsilon for the quantum hall effect is related to a free parameter.
In contrast, to explain the fractional quantum hall effect we need to take interactions. The focus is on the interplay between microscopic wavefunctions, longdistance effective chernsimons theories, and the modes which live on the boundary. The integer quantum hall effect concerns the transport properties of a 2 dimensional electron system in the. Introduction to the fractional quantum hall e ect steven m. Crucially, the magnetic field leads to nontrivial band topology and breaks time. Feb 14, 2020 at charge neutrality, the ensuing ground state is a quantum hall ferromagnet with two filled states of identical spin polarization and an edge dispersion that exhibits two counterpropagating, spinfiltered helical edge channels fig. Fba items qualify for free shipping and amazon prime. Ppt quantum hall effects an introduction powerpoint.
Three dimensional generalization topological insulator, surface states. The advent of black phosphorus fieldeffect transistors fets has brought new possibilities in the study of twodimensional 2d electron systems. Girvin, the quantum hall effect 2nd edition, springer 1990. The quantum spin hall effect theory and experiment pdf. The unexpected discovery of the quantum hall effect was the result of basic research on silicon field effect transistors combined with my experience in metrology, the science of measurements. The quantum hall effect is a set of phenomena observed at low temperature in a twodimensional electron gas subject to a strong perpendicular magnetic field. The free electron mass me in equation 1 is replaced with an effective mass m. Quantum hall effect advanced condensed matter physics iitg. Quantum hall effect an overview sciencedirect topics. Semiconductor hall effect basic concepts, numerical on hall effect. The quantum hall effect is a quantummechanical version of the hall effect, observed in.
Roomtemperature quantum anomalous hall effect in single. From the dirac equation of an electron in an anisotropic conduction band, the anisotropy of its motion dramatically affects its interaction with applied electric and magnetic fields. Quantized hall plateaus have been found corresponding to a few even denominator fractions. Quantum hall effect 55 skipping cyclotron orbits fourterminal sample configuration to measure the hall and longitudinal resistivities quantum hall effect 56 for a given plateau not a perfect conductor. The precise quantization of the electrical resistance involved in the quantized hall effect phenomena has led to the new definition of the resistance standard and has metrologically. Worlds best powerpoint templates crystalgraphics offers more powerpoint templates than anyone else in the world, with over 4 million to choose from. The energy of the electrons for a motion perpendicular to the surface is quantized particle in a box and even the free motion of the electrons in the plane of the. Quantum confinement of atoms and electrons to two dimensions 2d profoundly alters their electronic properties, giving rise to celebrated phenomena, such as the integer and fractional quantum hall qh effect, quantum spin hall effects 24, and interfacial superconductivity and magnetism, as well as technological development, such as. Plotting the hall resistance essentially the reciprocal of the hall conductance of a lowtemperature twodimensional electron gas against the strength of the imposed magnetic field normal to the gas plane, one finds a stairlike quantized sequence of hall conductances very precisely equal to ne 2 h, where n is the integer that characterizes each.
The quantum spin hall effect qshe is observable in twodimensional metals without spinorbit coupling. Winner of the standing ovation award for best powerpoint templates from presentations magazine. Publication date 1987 topics hall effect, quantum theory publisher new york. The discovery of the quantized and fractional quantum hall effect phenomena is among the most important physics findings in the latter half of this century. Jun 21, 2016 the purpose of these lectures is to describe the basic theoretical structures underlying the rich and beautiful physics of the quantum hall effect.
The transverse voltage hall effect measured in a hall probe has its origin in the magnetic force on a moving charge carrier. Quantum hall effect in electrondoped black phosphorus. The dimensionality of the zeeman interaction plays an important role in the qshe, and profoundly modifies. It is shown that an increase in the strength of the coulomb interaction. H is the external magnetic field, and m is the magnetization. Balram and songyang pu and jianyun zhao and arkadiusz w\ojs and jainendra k. This compilation of reprinted articles on one of the most intriguing phenomena in modern physics, the quantum hall effect, is intended as a reference for students and research workers in. It is used to determine the concentration of electrons. At the same time, it is now well understood that these topological invariants can be reexpressed in terms of single particle greens functions 4. Model for a quantum hall eff ect without landau levels. Theyll give your presentations a professional, memorable appearance the kind of sophisticated look that todays audiences expect. The quantum spin hall effect theory and experiment pdf download. A new 2d electronic phase gapless edge states and transport time reversal symmetry and z 2 topological stability. This model is important because it provides a simple 2 band description of the quantum hall effect.
A phenomenon exhibited by certain semiconductor devices at low temperatures and high magnetic fields, whereby the hall resistance becomes precisely equal to. The quantum spin hall effect is a unique phase of matter in which the bulk of the material is an insulator, but. Dynamical quantum hall effect in the parameter space pnas. The quantum anomalous hall qah effect is a fascinating quantum phenomenon characterized by a nonzero chern number defined in the bulk and chiral edge states in the boundary. Pdf how low can the fractional quantum hall effect go. In 1980, it was discovered that the hall effect is quantized, an example of quantum behavior in a macroscopic object.
We experimentally and theoretically study artificially enhanced spinorbit coupling in graphene via. The integer quantum hall effect can be understood using free electrons. The drude model envisions a conductor as a gas of free currentcarrying charges. The purpose of these lectures is to describe the basic theoretical structures underlying the rich and beautiful physics of the quantum hall effect. Quantum hall effect article about quantum hall effect by. For sufficiently strong magnetic fields, each landau level may have so many states that all of the free electrons in the system sit in only a few landau levels. Hall effect experiment utk department of physics and. The integer quantum hall effect is very well understood, and can be simply explained in terms of singleparticle orbitals of an electron in a magnetic field see landau quantization. We report on the properties of a system of interacting electrons in a narrow channel in the quantum hall effect regime. The quantum hall effect qhe is one of the most fascinating and. Why do we care about spinorbit interaction or why mercury is liquid. Pdf quantum hall effect and the topological number in. Quantum hall effects an introduction 1 quantum hall effects an introduction m.
The free electron quantum gas model still predicts a hall coe. An example of the quantum hall effect in a band theory is provided by a simple model of graphene in a periodic magnetic field introduced by haldane 34. Pdf quantum spin hall effect in electric and magnetic. Magnet lab press release quantum hall effect observed at room. Quantum spin hall effect spin orbit induced energy gap in graphene. The latter is shown tobe expandable in the power series ofm2p2, with p being the modulus ofthe momentum of a single hall. In this book, only the underlying physics of the quantum hall effects are discussed and they are introduced in simple, intuitive pictures. The quantum hall effect was originally observed in twodimensional electron systems subjected to a magnetic field. The basics are described well but theres nothing about chernsimons theories or the importance of the edge modes. Topological invariants for fractional quantum hall states. Surface transport and quantum hall effect in ambipolar. The hall effect is the production of a voltage difference the hall voltage across an electrical conductor, transverse to an electric current in the conductor and a magnetic field perpendicular.
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