Decomposition of $L^{2}$-Vector Fields on Lipschitz Surfaces: Characterization via Null-Spaces of the Scalar Potential | Zendy

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Decomposition of $L^{2}$-Vector Fields on Lipschitz Surfaces: Characterization via Null-Spaces of the Scalar Potential

Author(s) -

Laurent Baratchart,

Christian Gerhards,

Alexander Kegeles

Publication year - 2021

Publication title -

siam journal on mathematical analysis

Language(s) - English

Resource type - Journals

SCImago Journal Rank - 1.882

H-Index - 92

eISSN - 1095-7154

pISSN - 0036-1410

DOI - 10.1137/20m1387754

Subject(s) - lipschitz continuity , omega , lipschitz domain , mathematics , bounded function , scalar (mathematics) , characterization (materials science) , boundary (topology) , domain (mathematical analysis) , combinatorics , pure mathematics , mathematical analysis , mathematical physics , physics , geometry , quantum mechanics , optics

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