Search results for " spherical harmonics"

showing 5 items of 5 documents

ANALYSIS OF A SPHERICAL HARMONICS EXPANSION MODEL OF PLASMA PHYSICS

2004

A spherical harmonics expansion model arising in plasma and semiconductor physics is analyzed. The model describes the distribution of particles in the position-energy space subject to a (given) electric potential and consists of a parabolic degenerate equation. The existence and uniqueness of global-in-time solutions is shown by semigroup theory if the particles are moving in a one-dimensional interval with Dirichlet boundary conditions. The degeneracy allows to show that there is no transport of particles across the boundary corresponding to zero energy. Furthermore, under certain conditions on the potential, it is proved that the solution converges in the long-time limit exponentially f…

Applied MathematicsMathematical analysisZonal spherical harmonicsBoundary (topology)Spherical harmonicssymbols.namesakeModeling and SimulationDirichlet boundary conditionSpin-weighted spherical harmonicssymbolsVector spherical harmonicsUniquenessMathematicsSolid harmonicsMathematical Models and Methods in Applied Sciences
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A star product on the spherical harmonics

1996

We explicitly define a star product on the spherical harmonics using the Moyal star product on ℝ6, and a polarization equation allowing its restriction on S2.

Mathematical analysisZonal spherical harmonicsA* search algorithmSpherical harmonicsStatistical and Nonlinear PhysicsAstrophysics::Cosmology and Extragalactic AstrophysicsPolarization (waves)law.inventionStar productlawSpin-weighted spherical harmonicsAstrophysics::Solar and Stellar AstrophysicsVector spherical harmonicsAstrophysics::Earth and Planetary AstrophysicsAstrophysics::Galaxy AstrophysicsMathematical PhysicsMathematicsSolid harmonicsLetters in Mathematical Physics
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Spherical Harmonics Expansion of Fundamental Solutions and Their Derivatives for Homogeneous Elliptic Operators

2017

In this work, a unified scheme for computing the fundamental solutions of a three-dimensional homogeneous elliptic partial differential operator is presented. The scheme is based on the Rayleigh expansion and on the Fourier representation of a homogeneous function. The scheme has the advantage of expressing the fundamental solutions and their derivatives up to the desired order without any term-by-term differentiation. Moreover, the coefficients of the series need to be computed only once, thus making the presented scheme attractive for numerical implementation. The scheme is employed to compute the fundamental solution of isotropic elasticity showing that the spherical harmonics expansion…

Mathematical analysisZonal spherical harmonicsSpherical harmonics02 engineering and technology01 natural sciencesboundary element methodComputer Science Applications010101 applied mathematicsElliptic operatorintegral equation020303 mechanical engineering & transports0203 mechanical engineeringModeling and SimulationSpin-weighted spherical harmonicsFundamental solutionVector spherical harmonicsspherical harmonicelliptic operator0101 mathematicsFundamental solutionTensor operatorMathematicsSolid harmonicsJournal of Multiscale Modelling
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Metodi Automatici per la Compensazione della Distorsione in Immagini di Risonanza Magnetica

Settore ING-INF/03 - TelecomunicazioniGeometric DistortionSpherical HarmonicMRI PhantomMRI; Geometric Distortion; Spherical Harmonics; MRI Phantom;MRI
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Spherical harmonic expansion of fundamental solutions and their derivatives for homogenous elliptic operators

2017

In this work, a unified scheme for computing the fundamental solutions of a three-dimensional homogeneous elliptic partial differential operator is presented. The scheme is based on the Rayleigh expansion and on the Fourier representation of a homogeneous function. The scheme has the advantage of expressing the fundamental solutions and their derivatives up to the desired order without any term-by-term differentiation. Moreover, the coefficients of the series need to be computed only once, thus making the presented scheme attractive for numerical implementation. The scheme is employed to compute the fundamental solution of isotropic elasticity showing that the spherical harmonics expansions…

fundamental solutions spherical harmonics elliptic operators integral equations boundary element methodSettore ING-IND/04 - Costruzioni E Strutture Aerospaziali
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