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000866337 019__ $$a1090901836$$a1091132483
000866337 020__ $$a9789811365003$$q(electronic book)
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000866337 0247_ $$a10.1007/978-981-13-6500-3$$2doi
000866337 035__ $$aSP(OCoLC)on1090764445
000866337 035__ $$aSP(OCoLC)1090764445$$z(OCoLC)1090901836$$z(OCoLC)1091132483
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000866337 08204 $$a515/.73$$223
000866337 1001_ $$aQian, Tao,$$eauthor.
000866337 24510 $$aSingular integrals and Fourier theory on Lipschitz boundaries /$$cTao Qian, Pengtao Li.
000866337 264_1 $$aSingapore :$$bSpringer ;$$aBeijing, China :$$bScience Press,$$c2019.
000866337 300__ $$a1 online resource (xv, 306 pages) :$$billustrations
000866337 336__ $$atext$$btxt$$2rdacontent
000866337 337__ $$acomputer$$bc$$2rdamedia
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000866337 5058_ $$a2.3 Singular Integrals on Starlike Lipschitz Curves2.4 Holomorphic Hinfty-Functional Calculus on Starlike Lipschitz Curves; 2.5 Remarks; References; 3 Clifford Analysis, Dirac Operator and the Fourier Transform; 3.1 Preliminaries on Clifford Analysis; 3.2 Monogenic Functions on Sectors; 3.3 Fourier Transforms on the Sectors; 3.4 Möbius Covariance of Iterated Dirac Operators; 3.5 The Fueter Theorem; 3.6 Remarks; References; 4 Convolution Singular Integral Operators on Lipschitz Surfaces; 4.1 Clifford-Valued Martingales; 4.2 Martingale Type T(b) Theorem
000866337 5058_ $$a6.4 The Analogous Theory in mathbbRn6.5 Hilbert Transforms on the Sphere and Lipschitz Surfaces; 6.6 Remarks; References; 7 The Fractional Fourier Multipliers on Lipschitz Curves and Surfaces; 7.1 The Fractional Fourier Multipliers on Lipschitz Curves; 7.2 Fractional Fourier Multipliers on Starlike Lipschitz Surfaces; 7.3 Integral Representation of Sobolev-Fourier Multipliers; 7.4 The Equivalence of Hardy-Sobolev Spaces; 7.5 Remarks; References; 8 Fourier Multipliers and Singular Integrals on mathbbCn; 8.1 A Class of Singular Integral Operators on the n-Complex Unit Sphere
000866337 5058_ $$a8.2 Fractional Multipliers on the Unit Complex Sphere8.3 Fourier Multipliers and Sobolev Spaces on Unit Complex Sphere; References; Bibliography; Index
000866337 506__ $$aAccess limited to authorized users.
000866337 588__ $$aOnline resource; title from PDF title page (SpringerLink, viewed March 27, 2019).
000866337 650_0 $$aLipschitz spaces.
000866337 650_0 $$aFourier analysis.
000866337 7001_ $$aLi, Pengtao,$$eauthor.
000866337 77608 $$iPrint version: $$z9811364990$$z9789811364990$$w(OCoLC)1082218563
000866337 852__ $$bebk
000866337 85640 $$3SpringerLink$$uhttps://univsouthin.idm.oclc.org/login?url=http://link.springer.com/10.1007/978-981-13-6500-3$$zOnline Access$$91397441.1
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