Results 281 to 290 of about 1,830,967 (336)
Correction: Modeling dyslexia in neurotypical adults by combining neuroimaging and neuromodulation techniques: a hypothesis paper. [PDF]
Front Hum NeurosciGallagher D, Huang Z, Ohta S.
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Deformable registration and generative modelling of aortic anatomies by auto-decoders and neural ODEs. [PDF]
NPJ Biol Phys MechTenderini R +6 more
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A 3-Dimensional Facial Analysis of Nasal Geometry Across Ethnicity, Sex, and Nasal Implants. [PDF]
Plast Reconstr Surg Glob OpenOng KHX +5 more
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Geometry-Texture Decomposition/Reconstruction Using a Proximal Interior Point Algorithm
, 2018 Marie-Caroline Corbineau +2 more
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Bending Properties of Standardized Photopolymer-Silicone Hybrid Structures Manufactured via PolyJet Matrix. [PDF]
Materials (Basel)Rudnik M +3 more
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The American Mathematical Monthly, 1985
(1985). Geometry Without Points. The American Mathematical Monthly: Vol. 92, No. 10, pp. 707-711.
G. Gerla, R. Volpe
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(1985). Geometry Without Points. The American Mathematical Monthly: Vol. 92, No. 10, pp. 707-711.
G. Gerla, R. Volpe
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Point-Reflection Geometries, Geometric K-Loops and Unitary Geometries
Results in Mathematics, 1997The authors use unitary geometries to show the existence of reflection geometries to which correspond \(K\)-loops with an incidence fibration \(F\) [\textit{E. Zizioli}, J. Geom. 30, 144-156 (1987; Zbl 0632.51019)] where \(F\) consists of proper subloops (other than groups).
Gabrieli, Elisabetta, Karzel, Helmut
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Journal of Geometry, 1997
The author continues his investigation in Geom. Dedicata 46, No. 1, 47-60 (1993; Zbl 0783.51002) of how geometries can be reconstructed from their automorphism groups. In the paper under review he considers incidence structures \((P,{\mathcal L})\) that admit sharply point transitive groups \(G\) of automorphisms. In this case, \(P\) is identified with
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The author continues his investigation in Geom. Dedicata 46, No. 1, 47-60 (1993; Zbl 0783.51002) of how geometries can be reconstructed from their automorphism groups. In the paper under review he considers incidence structures \((P,{\mathcal L})\) that admit sharply point transitive groups \(G\) of automorphisms. In this case, \(P\) is identified with
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The Mathematical Gazette, 1952
Finite Galois arithmetics are well-known; finite geometries however, though more interesting to the amateur, have not really acquired professional status and do not appear to any great extent in standard works. The following example arose from a chance remark in Mathematics for T. C.
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Finite Galois arithmetics are well-known; finite geometries however, though more interesting to the amateur, have not really acquired professional status and do not appear to any great extent in standard works. The following example arose from a chance remark in Mathematics for T. C.
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The Mathematical Gazette, 1955
The following paragraphs have been assembled in consequence of my reading Dr. Cundy’s note on 25-point geometry. Towards the end of it, apparently mindful of the adjunction of a “ line at infinity ” to the Euclidean plane, he adjoins a line to the 25-point plane and so obtains a geometry of 31 points. Here I reverse this procedure :
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The following paragraphs have been assembled in consequence of my reading Dr. Cundy’s note on 25-point geometry. Towards the end of it, apparently mindful of the adjunction of a “ line at infinity ” to the Euclidean plane, he adjoins a line to the 25-point plane and so obtains a geometry of 31 points. Here I reverse this procedure :
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