Laplacian in polar coordinates, regular singular function algebra, and theory of distributions

Cantelaube, Y. C.; Khélif, Anatole

doi:10.1063/1.3359019

Cited by 9 publications

(17 citation statements)

References 4 publications

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“…But this idea, unfortunately, had not been responded during large time. The strict mathematical substantiation, as a singularity of the radial Laplacian, this fact acquires in [10,11]. Interesting enough, that this fact has rather general character, because it does not depend on particular potential -is it regular or singular.…”

Section: Discussionmentioning

confidence: 99%

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Dirac’s reduced radial equations and the problem of additional solutions

Khelashvili

Nadareishvili

2017

Int. J. Mod. Phys. E

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We show that additional solutions must be ignored (in differences of the Schrodinger and Klein-Gordon equations) in the Dirac equation, where usually passed the second order radial equation, called the reduced equation, instead of a system. Analogously to the Schrodinger equation, in this process the Dirac's delta function appears, which was unnoted during the full history of quantum mechanics. This unphysical term we remove by a boundary condition at the origin. However, the distribution theory imposes on the radial function strong restriction and by this reason practically for all potentials, even regular, use of these reduced equations is not permissible. At the end we include consideration in the framework of two-dimensional Dirac equation. We show that even here the additional solution does not survives as a result of usual physical requirements.

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Section: Discussionmentioning

confidence: 99%

“…Only character of turning to zero depends on potential. This problem takes place also in Laplace operators on three-and more-dimensions [10].…”

Section: Discussionmentioning

confidence: 99%

Dirac’s reduced radial equations and the problem of additional solutions

Khelashvili

Nadareishvili

2017

Int. J. Mod. Phys. E

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“…The example of misunderstandings with singular coordinate transformations and using of improper boundary conditions is the appearance of the fictitious delta function in the Laplace equation in spherical coordinates [36][37][38]. It is known that the regular solutions to the Laplace equation in Cartesian coordinates,…”

Section: On the Singular Coordinate Transformationsmentioning

confidence: 99%

Can Quantum Particles Cross a Horizon?

Gogberashvili

2019

Int J Theor Phys

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The prevalent opinion that infalling objects can freely cross a black hole horizon is based on the assumptions that the horizon region is governed by classical General Relativity and by specific singular coordinate transformations it is possible to remove divergences in the geodesic equations. However, the coordinate transformations usually used to demonstrate the geodesic completeness are of class C 0 , while the standard causality theory requires that the metric tensor to be at least C 1 . Introduction of C 0 -class functions leads to the appearance of the additional delta-like sources in the Einstein equations and in the equations for quantum particles. Therefore, to explore the horizon region, in addition to the classical geodesic equations, one needs to use equation of quantum particles. Applying physical boundary conditions at the Schwarzschild and Kerr event horizons, we show existence of the exponentially decay/enhanced solutions (with the complex phases) to the Klein-Gordon equation. This means that in semi-classical approximation particles probably do not enter the black hole horizon, but are absorbed/reflected by it. Then it follows that the minimal classical size of any isolated body is its horizon radius, what potentially can solve main black hole mysteries.

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“…In order to obtain a kernel function from a homogeneous symbol it is necessary to apply an appropriate regularization technique at η → 0, cf. [5,12,13], which gives rise to logarithmic terms in t their asymptotic expansions. Let us briefly recall where the logarithmic terms in the kernel functions come from.…”

Section: Kernel Functions Of Classical Pseudo-differential Operatorsmentioning

confidence: 99%

Singular analysis and coupled cluster theory

Flad

Harutyunyan

Schulze

2015

Phys. Chem. Chem. Phys.

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The primary motivation for systematic bases in first principles electronic structure simulations is to derive physical and chemical properties of molecules and solids with predetermined accuracy. This requires a detailed understanding of the asymptotic behaviour of many-particle Coulomb systems near coalescence points of particles. Singular analysis provides a convenient framework to study the asymptotic behaviour of wavefunctions near these singularities. In the present work, we want to introduce the mathematical framework of singular analysis and discuss a novel asymptotic parametrix construction for Hamiltonians of many-particle Coulomb systems. This corresponds to the construction of an approximate inverse of a Hamiltonian operator with remainder given by a so-called Green operator. The Green operator encodes essential asymptotic information and we present as our main result an explicit asymptotic formula for this operator. First applications to many-particle models in quantum chemistry are presented in order to demonstrate the feasibility of our approach. The focus is on the asymptotic behaviour of ladder diagrams, which provide the dominant contribution to shortrange correlation in coupled cluster theory. Furthermore, we discuss possible consequences of our asymptotic analysis with respect to adaptive wavelet approximation.

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Laplacian in polar coordinates, regular singular function algebra, and theory of distributions

Cited by 9 publications

References 4 publications

Dirac’s reduced radial equations and the problem of additional solutions

Dirac’s reduced radial equations and the problem of additional solutions

Can Quantum Particles Cross a Horizon?

Singular analysis and coupled cluster theory

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