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Spatiospectral concentration of vector fields on a sphere

Author(s): Plattner, Alain; Simons, Frederik J

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dc.contributor.authorPlattner, Alain-
dc.contributor.authorSimons, Frederik J-
dc.date.accessioned2023-12-11T18:05:05Z-
dc.date.available2023-12-11T18:05:05Z-
dc.date.issued2014-01en_US
dc.identifier.citationPlattner, Alain, and Frederik J. Simons. "Spatiospectral concentration of vector fields on a sphere." Applied and Computational Harmonic Analysis 36, no. 1 (2014): 1-22. doi:10.1016/j.acha.2012.12.001.en_US
dc.identifier.issn1063-5203-
dc.identifier.urihttps://arxiv.org/pdf/1306.3201.pdf-
dc.identifier.urihttp://arks.princeton.edu/ark:/88435/pr1n00zt2f-
dc.description.abstractWe construct spherical vector bases that are bandlimited and spatially concentrated, or, alternatively, spacelimited and spectrally concentrated, suitable for the analysis and representation of real-valued vector fields on the surface of the unit sphere, as arises in the natural and biomedical sciences, and engineering. Building on the original approach of Slepian, Landau, and Pollak we concentrate the energy of our function bases into arbitrarily shaped regions of interest on the sphere, and within certain bandlimits in the vector spherical-harmonic domain. As with the concentration problem for scalar functions on the sphere, which has been treated in detail elsewhere, a Slepian vector basis can be constructed by solving a finite-dimensional algebraic eigenvalue problem. The eigenvalue problem decouples into separate problems for the radial and tangential components. For regions with advanced symmetry such as polar caps, the spectral concentration kernel matrix is very easily calculated and block-diagonal, lending itself to efficient diagonalization. The number of spatiospectrally well-concentrated vector fields is well estimated by a Shannon number that only depends on the area of the target region and the maximal spherical-harmonic degree or bandwidth. The spherical Slepian vector basis is doubly orthogonal, both over the entire sphere and over the geographic target region. Like its scalar counterparts it should be a powerful tool in the inversion, approximation and extension of bandlimited fields on the sphere: vector fields such as gravity and magnetism in the earth and planetary sciences, or electromagnetic fields in optics, antenna theory and medical imaging.en_US
dc.format.extent1 - 22en_US
dc.language.isoen_USen_US
dc.relation.ispartofApplied and Computational Harmonic Analysisen_US
dc.rightsAuthor's manuscripten_US
dc.titleSpatiospectral concentration of vector fields on a sphereen_US
dc.typeJournal Articleen_US
dc.identifier.doidoi:10.1016/j.acha.2012.12.001-
dc.date.eissued2013-01-03en_US
pu.type.symplectichttp://www.symplectic.co.uk/publications/atom-terms/1.0/journal-articleen_US

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