Hilbert's Theorem, via moving frames
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Publication:6382641
arXiv2111.05462MaRDI QIDQ6382641
Publication date: 9 November 2021
Abstract: We present a proof that the hyperbolic plane cannot be isometrically immersed in Euclidean -space by a map. Ideas from many topics in (essentially) undergraduate mathematics are applied; the use of moving frames and connection forms to express the geometry simplifies the outline of the proof, compared to, say, using coordinate patches and Christoffel symbols. The key transition is from expressions in terms of the principal directions on the immersed surface (which give access to the Gaussian curvature) to expressions in terms of the asymptotic directions (which yield a coordinate system and give access to surface area).
Differential geometry of immersions (minimal, prescribed curvature, tight, etc.) (53C42) Global surface theory (convex surfaces à la A. D. Aleksandrov) (53C45)
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