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Gas Turbine Blade Failures Repaired Using Laser Metal Additive Remanufacturing. [PDF]
Materials (Basel)Chen C, Zhang M, Liu H, Yang Q.
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Noether symmetries in Gauss-Bonnet-teleparallel cosmology. [PDF]
Eur Phys J C Part Fields, 2016 Capozziello S +2 more
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The Gauss-Bonnet Theorem for V-manifolds.
Journal of the Mathematical Society of Japan, 1957 openaire +2 more sources
Cohomology Rings of Toric Bundles and the Ring of Conditions. [PDF]
Arnold Math JHofscheier J, Khovanskii A, Monin L.
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Chloroplasts with clefts and holes: a reassessment of the chloroplast shape using 3D FE-SEM cellular reconstruction of two species of Chlamydomonas. [PDF]
ProtoplasmaSato N +5 more
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Migrasome formation is initiated preferentially in tubular junctions by membrane tension. [PDF]
Biophys JZucker B +5 more
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Topological defects drive influenza glycoprotein lattice assembly on spherical membranes
Liu ZB +4 more
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2012
The purpose of this chapter is to give a proof of the Gauss-Bonnet theorem, undoubtedly one of the most important (if not simply the most important) results in the differential geometry of surfaces. The Gauss-Bonnet theorem uncovers an unexpected and deep relation between purely local notions, defined in differential terms, such as Gaussian and ...
Marco Abate, Francesca Tovena
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The purpose of this chapter is to give a proof of the Gauss-Bonnet theorem, undoubtedly one of the most important (if not simply the most important) results in the differential geometry of surfaces. The Gauss-Bonnet theorem uncovers an unexpected and deep relation between purely local notions, defined in differential terms, such as Gaussian and ...
Marco Abate, Francesca Tovena
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1997
We are finally in a position to prove our first major local-global theorem in Riemannian geometry: the Gauss-Bonnet theorem. This is a local-global theorem par excellence, because it asserts the equality of two very differently defined quantities on a compact, orientable Riemannian 2-manifold M: the integral of the Gaussian curvature, which is ...
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We are finally in a position to prove our first major local-global theorem in Riemannian geometry: the Gauss-Bonnet theorem. This is a local-global theorem par excellence, because it asserts the equality of two very differently defined quantities on a compact, orientable Riemannian 2-manifold M: the integral of the Gaussian curvature, which is ...
openaire +2 more sources