Results 291 to 300 of about 90,774 (312)
Enhanced Prediction of Soil Carbon via Encoder-Decoder Neural Networks for a Boreal Study Area in Northern Ontario. [PDF]
Sensors (Basel)Pittman R, Hu B.
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Walsh’s Conformal Map onto Lemniscatic Domains for Several Intervals
Klaus Schiefermayr, Olivier Sète
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<i>In vivo</i> bioluminescence tomography-guided system for pancreatic cancer radiotherapy research. [PDF]
Biomed Opt ExpressDeng Z +6 more
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Conform: a conformal mapping system [PDF]
Proceedings of the fifth ACM symposium on Symbolic and algebraic computation - SYMSAC '86, 1986 Conform consists of a collection of LISP routines that permit the real time manipulation and display of conformal mappings of one complex plane onto another.
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Science, 2006
An invisibility device should guide light around an object as if nothing were there, regardless of where the light comes from. Ideal invisibility devices are impossible, owing to the wave nature of light. This study develops a general recipe for the design of media that create perfect invisibility within the accuracy of geometrical optics.
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An invisibility device should guide light around an object as if nothing were there, regardless of where the light comes from. Ideal invisibility devices are impossible, owing to the wave nature of light. This study develops a general recipe for the design of media that create perfect invisibility within the accuracy of geometrical optics.
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Conformal and quasi-conformal mappings
2016In this short section we shall introduce a class of mappings in \(\mathbb{C} \;\mathrm{and}\; \mathbb{B}\) named after the German mathematician AUGUST FERDINAND MOBIUS (1790–1868). In \(\it C l(n)\) this is also possible, but it is a bit more difficult, the reader is referred to our book [118].
Wolfgang Sprößig +2 more
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1993
Mapping techniques are mathematical methods which are frequently applied for solving fluid flow problems in the interior involving bodies of nonregular shape. Since the advent of supercomputers such techniques have become quite important in the context of numerical grid generation [1] .
L. Jaschke, H. J. Halin
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Mapping techniques are mathematical methods which are frequently applied for solving fluid flow problems in the interior involving bodies of nonregular shape. Since the advent of supercomputers such techniques have become quite important in the context of numerical grid generation [1] .
L. Jaschke, H. J. Halin
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Conformal and semi-conformal biharmonic maps
Annals of Global Analysis and Geometry, 2008We show that a conformal mapping between Riemannian manifolds of the same dimension n ≥ 3 is biharmonic if and only if the gradient of its dilation satisfies a certain second-order elliptic partial differential equation. On an Einstein manifold solutions can be generated from isoparametric functions.
Seddik Ouakkas, Ali Fardoun, Paul Baird
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2017
In this chapter, we first give a brief overview of the classical theory of quasiconformal mappings in the complex plane and then we explain how to extend it in general metric spaces (under geometric assumptions). Applications to complex dynamics and to (complex) hyperbolic geometry are also discussed.
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In this chapter, we first give a brief overview of the classical theory of quasiconformal mappings in the complex plane and then we explain how to extend it in general metric spaces (under geometric assumptions). Applications to complex dynamics and to (complex) hyperbolic geometry are also discussed.
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