Results 81 to 90 of about 4,681 (167)
DIFFEOMORPHIC REGISTRATION FOR RETINOTOPIC MAPPING VIA QUASICONFORMAL MAPPING. [PDF]
Proc IEEE Int Symp Biomed Imaging, 2020 Tu Y, Ta D, Gu XD, Lu ZL, Wang Y.
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Diffeomorphic registration for retinotopic maps of multiple visual regions. [PDF]
Brain Struct Funct, 2022 Tu Y, Li X, Lu ZL, Wang Y.
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Doubling measures and quasiconformal maps
Commentarii Mathematici Helvetici, 1992 In the study of quasiconformal maps, one commonly asks, ``Which classes of maps or measures are preserved under quasiconformal maps?'', and conversely, ``When does the said preservation property imply the quasiconformality of the map''''. These questions have been previously studied by Reimann, Uchiyama, and the author with respect to the classes of ...
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Characterizing visual cortical magnification with topological smoothing and optimal transportation. [PDF]
Proc SPIE Int Soc Opt Eng, 2023 Xiong Y, Tu Y, Lu ZL, Wang Y.
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Topological Receptive Field Model for Human Retinotopic Mapping. [PDF]
Med Image Comput Comput Assist Interv, 2021 Tu Y, Ta D, Lu ZL, Wang Y.
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Protocol for topology-preserving smoothing of BOLD fMRI retinotopic maps of the human visual cortex. [PDF]
STAR Protoc, 2022 Tu Y, Li X, Lu ZL, Wang Y.
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Carleson's Inequality and Quasiconformal Mappings
Rocky Mountain Journal of Mathematics, 1994 Let \(f\) be a \(K\)-quasiconformal mapping of \(B^ n\) into \(\mathbb{R}^ n\). Define \[ \| f\|_{H^ p}= \limsup_{r\to 1} \left(\int_{S^{n-1}}| f(rs)|^ p d\sigma(s)\right)^{1/p}, \] where \(s\in S^{n-1}= \partial B^ n\), and \(d\sigma\) is the surface area measure on \(S^{n-1}\). The author proves Theorem 1.3.
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Holder spaces of quasiconformal mappings
Publications de l'Institut Mathematique, 2004 Der Verfasser gibt interessante neue Beiträge zum Fragenkreis ``Hölder Stetigkeit, Stetigkeitsmodul, lineare Dilatation'' bei quasikonformen Abbildungen in der Ebene.
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Duality of capacities and Sobolev extendability in the plane. [PDF]
Complex Analysis Synerg, 2021 Zhang YR.
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On the quasi-isometric and bi-Lipschitz classification of 3D Riemannian Lie groups. [PDF]
Geom Dedic, 2021 Fässler K, Le Donne E.
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