Iii we separate variables and solve the klein gordon equation. For example, the dirac equation for an electron implies the klein gordon equation, but not conversely. The new symmetry exhibited by these equations is investigated. What is the relationship between the dirac equation and the. Nevertheless, somehow the physical importance of the potentials, rather then only the e and b elds, wasnt wider spread to the broader community. The problems with the kleingordon equation led dirac to search for an. Solutions of klein gordon equation free particle solutions for u 0. Indeed, the klein gordon equation only expresses the mass shell constraint and nothing else. We establish local and global existence results for dirackleingordon equations in one space dimension, employing a null form estimate and a. A universal quantum wave equation that yields dirac, klein gordon, schrodinger and quantum heat equations is derived.
Lorentzinvariant differential equations which take the place of the schrodinger equation of a par. In particle physics, the dirac equation is a relativistic wave equation derived by british physicist paul dirac in 1928. Electromagnetic kleingordon and dirac equations in scale relativity. The separation of variables for the klein gordon and dirac equations, in the presence of electromagnetic fields, for a class of curvilinear coordinate systems with a null coordinate is presented. A direct proof of global existence for the dirackleingordon. The overall fourmomentum transfer is still q, but it has to be divided between the two. This generalizes to particles of any spin due extension to the bargmannwigner equations. The plane waves 10 are basic solutions and the field 9 is constructed by.
Derivation of klein gordon equation or relativistic schrodinger equation, klein gordan equation is relativistic wave equation. Kleingordon equation article about kleingordon equation. Lorentz transformations the free particle kleingordon equation 10. Now, suppose a solution to the klein gordon equation is a free particle with energy eand momentum p ip ne x 11 1. A direct proof of global existence for the dirackleingordon equations in one space dimension yungfu fang1 abstract. Klein gordon equation f eynman stuec k elburg in terpretation dirac equation an tiparticles f ermion spin co v arian t notation massless fermions learning outcomes be able to deriv e k g equation and explain ph ysical meaning of v e e solutions. Is the dirac equation equivalent to the kleingordon. We explore klein gordon equation in the new framework of quasihermitian quantum mechanics. In its free form, or including electromagnetic interactions, it describes all spin1 2 massive particles such as electrons and quarks for which parity is a symmetry.
We compare the solutions and the energy spectra obtained with the corresponding ones from the dirac equation for a spin onehalf relativistic particle. We study the thermodynamic quantities such as the helmholtz free energy, the mean energy and the specific heat for both the klein gordon, and dirac equations. The fact that these two equations, for free particles, are constructed using two objects. The non relativistic limit of the real kleingordon equation. The timedependent klein gordon and dirac equations are solved for the motion of a charged particle in a classical uniform electrostatic field of infinite extent.
Electromagnetic kleingordon and dirac equations in scale. The elementary solutions have a position dependence of the form eik r with the component of k in the field direction varying linearly with time. Nov 16, 2017 to illustrate this point, we solve the problem of a spin zero relativistic particle in a one and threedimensional box using the klein gordon equation in the feshbachvillars formalism. The dirac equation provides a description of elementary spinhalf particles, such as electrons. Introduction to relativistic quantum mechanics smokey. We show here that if one tries to derive the electromagnetic dirac equation from the kleingordon one as for the free particle motion, i. The case with the dominating klein gordon term is considered. In the present work, we like to study the cauchy problem for the dirac klein gordon equations. Exact solution of kleingordon and dirac equations with. The problems with the klein gordon equation led dirac to search for an alternative relativistic wave equation in 1928, in which the time and space derivatives are. Separation of variables for the kleingordon and dirac.
He then tried to find solutions, but was dismayed to find that problems like nonpositivedefinite probability curre. A complex field remains a complex field as expected for nonrelativistic problems where we are all familiar with wave functions and their interpretation. Relativistic quantum mechanics kleingordon equation dirac. Inequivalence of klein gordon and dirac equation hans detlef hutten bach abstract. Gordon and dirac equations are obtained for a particle moving in an arbitrary plane electromagnetic wave in vacuo plus a uniform static magnetic field parallel to the direction of propagation of the electromagnetic wave. Comparison among kleingordon equation, dirac equation and. The interaction of pseudo scalar particles with the electromagnetic field is described by the minimal substitution. The components of every free field satistfy the klein gordon equation, irrespective of their spin.
Dec 31, 2011 it may be worth mentioning that just as the 1component non relativistic schrodinger equation can be tweaked to accommodate spin by adding on a itex \sigma. Chapter 11 em lorentz force derived from klein gordons. Klein gordon for spin1 particle photon stack exchange. We obtain exact solutions of the dirac and kleingordon equations for a static diagonal metric. This is a case where an incautious assumption at the outset led to misinterpretation. Inequivalence of kleingordon and dirac equation hans detlef hutten. The dirac equation the problems with the klein gordon equation all came about because of the square root required to get the energy. We show here that if one tries to derive the electromagnetic dirac equation from the klein gordon one as for the free particle motion, i. If youve never seen this, try working out the following. The kleingordon equation in the spacetime representation 9 the quantity q2 is represented by the differential operator dalembert operator from the mass shell condition 6 this results in the kleingordon equation as the basic field equation of the scalar field. As seen in the dispersion relation for graphene, for low energies near the dirac point, electrons obey a dirac equation with m 0 and c v f, the fermi velocity. Ppt relativistic qm the klein gordon equation 1926. Relativistic quantum mechanics download ebook pdf, epub. Klein gordon equation derivation and continuity equations 3 energies, were taken to be major problems with the klein gordon equation which led to it being disregarded initially as a valid relativistic equation.
Previously, quantum motion equations schrodinger, klein gordon, dirac, pauli have been derived as geodesic equations written with a quantumcovariant derivative operator. The elementary solutions have a position dependence of the form eik. For a free fermion the wavefunction is the product of a plane wave and a. The dirac equation is more restrictive than the klein gordon equation. The green function for klein gordon dirac equation is obtained.
Since we want the lagrangian density to be invariant under lorentz transformations a linear wave equation, the lagrangian density can contain only the. Stochastic derivation of the kleingordon equation from. Quantization of the free dirac field university of illinois. The equation does not form the basis of a consistent quantum relativistic oneparticle theory. Is the dirac equation equivalent to the kleingordon equation. Klein gordon equations in one space dimension, employing a null form estimate and a. China weimin zhouy and jun yanz department of physics, new york university, 4 washington place, new york, ny, 3 a particle is always not pure.
Solutions to common problems with probability interpretation and inde. The non relativistic limit of the klein gordon equation kg is the schrodinger equation s. We will come back to the question what it actually describes later on. Dirac fine structure increased 3p32, 3d32 2sl2 12 lamb shift increased hyperfine structure increased bohr levels. In contrast to the klein gordon case, the situation is more complicated in the case of the dirac equation and this complication is basically due to the square root, which appears in the expressions of and. Then, the nature of gauge transformations, of gauge fields and of conserved charges have been given a geometric meaning in terms of a scalecovariant derivative tool. Regularity results for the dirackleingordon equations. Derivation of dirac, kleingordon, schrodinger, diffusion. Relativistic quantum mechanics is developed, including the klein gordon equation and up to the dirac equation. The kleingordon equation is a linear homogeneous secondorder partial differential equation with constant coefficients. Note that any solution to the free dirac equation is automatically a solution to the free klein gordon equation but the converse is not true. In its free form, or including electromagnetic interactions, it describes all.
The background to the story of the dirac equation is the story of. Pdf stationary solutions of the maxwelldirac and the. There seems to be a formal analogy between our problem and a certain. Fourmomentum a free particle in the nonrelativistic limit obeys. The discovery of dirac equation and its impact on presentday physics.
Since it is secondorder in time like the classical wave equation from classical lorentzinvariant em, probability density is not explicitly always conserved. Bound state solutions of threedimensional kleingordon. We study the thermodynamic quantities such as the helmholtz free energy, the mean energy and the specific heat for both the. In sec iv, using the algebraic method of separation of variables, we reduce the dirac equation to a system of rst order coupled di erential equations that we solve in terms of special functions. Pdf kleingordon type equations with a singular time. Comparison among klein gordon equation, dirac equation and relativistic stationary schr. In this study, we investigate the relativistic klein gordon equation analytically for the dengfan potential and hulthen plus eckart potential under the equal vector and scalar potential conditions. We introduce some changes of variables, we show that a onedimensional linear potential for the relativistic system in a space deformed can be equivalent to the. To handle this problem, dirac appealed to the fact that electrons are fermions and no two electrons could take the same quantum state the pauli exclusion principle. Furthermore, any component of any solution to the free dirac equation for a spin12 particle is automatically a solution to the free kleingordon equation.
A direct proof of global existence for the dirac klein gordon equations in one space dimension fang, yungfu, taiwanese journal of mathematics, 2004. Introduction to relativistic quantum mechanics 250 an equation in relativistic quantum field theory. The klein gordon equation is then derived by a stochastic variational principle with the classical einstein action. These equations are related by complex transformation of space, time and mass. Therefore, a system that can be described by a complex solution to the klein gordon equation also be described by a system of two independent particles with equal mass that have real solutions to the klein klein gordon equation. The dirac equation the hydrogen atom why do we need the dirac equation. This equation is associated with the relativistic relationship between the energy. Dirac and kleingordon equations with equal scalar and vector potentials a.
Now, the fourcurrent density fj g3 0 associated with the dirac equation for a. It should be added, however, that it was dirac who found most of the additional insights. Kleingordon and dirac equations with thermodynamic quantities. Klein gordon equation and particles with spin physics forums. There is no problem at least at the level of the free field equation.
Relativistic qm the klein gordon equation 1926 1 relativistic qm the klein gordon equation 1926 scalar particle field j0 energy eigenvalues 1927 dirac tried to eliminate negative solutions by writing a relativistic equation linear in e a theory of fermions 1934 pauli and weisskopf revived kg equation with. In particular, every component of the dirac equations solves the klein gordon equation. Low regularity global solutions of the dirac klein gordon equations in one space dimension bournaveas, nikolaos and gibbeson, dominic, differential and integral equations, 2006. The spinor of mass minimally coupled to gravity is described by the dirac equation with. The kleingordon equation is applied in the description of mesons and corresponding fields.
Dirac equation and quantum relativistic effects in a single trapped ion l. The dirac equation a great deal more was hidden in the dirac equation than the author had expected when he wrote it down in 1928. Any solution of the free dirac equation is, componentwise, a solution of the free klein gordon equation. We show that these coordinates can be associated with a system with constant acceleration. Kleingordon equation mathematics and physics wiki fandom. As in the comments, fulfilment of the klein gordon equation is only a necessary condition for a field and it is fulfilled by all fields. Dirac himself remarked in one of his talks that his equation was more intelligent than its author. Download fulltext pdf klein gordon type equations with a singular timedependent potential article pdf available in rendiconti dellistituto di matematica delluniversita di trieste xxxix. Download fulltext pdf stationary solutions of the maxwell dirac and the kleingordondirac equations article pdf available in calculus of variations 43. Klein gordon equation dirac equation the hydrogen atom. The kleingordon equation is a relativistic wave equation, related to the schrodinger equation. Comparison among kleingordon equation, dirac equation.
Mod01 lec01 introduction, the kleingordon equation. A critical case on the dirac klein gordon equations in one space dimension fang, yungfu and huang, hsiuchuan, taiwanese journal of mathematics, 2008. Spin comes in when one looks at what happens to the components. Separation of variables and exact solution of the klein. What is the relationship between the dirac equation and. The discovery of dirac equation and its impact on present. However, the klein gordon equation has issues when interpreted as a standard wave equation. A new proof of global existence for the dirac kleingordon. Boththe klein gordon and dirac wave equations arediscussed in terms of the spherical harmonics with spinweight. Let us now discuss the construction of the ground state and of the excitation spectrum.
It is the purpose of the present article to solve the klein gordon and dirac equations in. We say the charge carriers in this case are \emergent dirac fermions. Plane wave solutions of the free dirac equation assume solutions of the form. Dirac equation and quantum relativistic effects in a single. For every solution to the dirac equation, its components will be a solution of the klein gordon equation, but the converse isnt true. But we have four dirac operators and only three pauli operators. Convergence of scattering operators for the klein gordon equation with a nonlocal nonlinearity sasaki, hironobu, differential and integral equations, 2006. For a free particle, the kleingordon equation is written. Click download or read online button to get relativistic quantum mechanics book now. The solution just like in the case with the wave function in the schrodinger equation just comes out to be some scalar function of x, y, z, and t. The dirac and kleingordon equations with equal scalar and.
The dirac equation has several signi cant consequences, for instance, the existence of antiparticles and spin. Comparison among kleingordon equation, dirac equation and relativistic stationary schr. Dirac tried to get round this by finding a field equation which was linear in the operators. Pdf dirac and kleingordon equations in curved space. There is no known such theory for particles of any spin. To illustrate this point, we solve the problem of a spin zero relativistic particle in a one and threedimensional box using the klein gordon equation in the feshbachvillars formalism.
Gordon equation in terms of differential operators. This site is like a library, use search box in the widget to get ebook that you want. For the love of physics walter lewin may 16, 2011 duration. The interacting klein gordon equation in the rst section is in fact diracs starting point in his 1928 paper where he introduces his famous dirac equation.
The relativistic wave equation of the electron ranks amo. Accordingly, we obtain the energy eigenvalues of the molecular systems in different states as well as the normalized wave function in terms of the generalized laguerre polynomials function through. Any solution of the free dirac equation is, componentwise, a solution of the free. The dirac equation was an attempt to solve this issue. The discovery of dirac equation and its impact on presentday physics reproduced with permission from dirac cmd feynman.
The dirac equation and the klein gordon kg equation are the most frequently used wave equations for the description of particle dynamics in relativistic quantum mechanics. The dirac equation is one of the two factors, and is conventionally taken to be p m 0 31 making the standard substitution, p. The development of quantum mechanics is presented from a historical perspective. Thus we study a system where we have two independent spins, one with the spin. Toobtain the dirac wave equation we use the factorizationof the secondorder invariant casimir operatorassociated to the fantappiede sitter group. Generalized klein gordon and dirac equations from nonlocal kinetic approach.
It is consistent with both the principles of quantum mechanics and the theory of special relativity, and was. Kleingordon and dirac equations with thermodynamic. In 1934 pauli and weisskopf 46 solved the problem by reinterpreting kleingordon equation in the context of quantum. Pio neers in quantum mechanics, edited by ranabir dull and asim k ray, wiley eastern limited, 1993. Physics 221b spring 2020 notes 45 introduction to the dirac.