Gaussian curvature in codimension > 1
Abstract
The Gaussian curvature K is a fundamental geometric quantity discovered by Gauss in the case of surfaces embedded in R3. One can naturally extend the definition of the Gaussian curvature to arbitrary submanifolds of Rk so that the extrinsic interpretation of K, the Theorema Egregium and the Gauss-Bonnet Theorem still hold. We give a concise exposition of these classical facts.
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