On Surfaces in Rn via Gauss Map, Caustics, Duality and Pseudo Euclidean Geometry of Quadratic Forms
Abstract
We get new results (and rederive some know ones) on smooth surfaces in Rn by unifying several view points into a coherent general view. Namely, we show and use new relations of the evolute (caustic) with the curvature ellipse, the Gauss map and the pseudo-Euclidean geometry of the 3-space of quadratic forms on R2. A key result (Th.3.3.1): for a surface M in Rn the intersection of its caustic with the normal space NpM is the polar dual hypersurface (in NpM) of the curvature ellipse at p. Moreover, all local objects X (cf. the invariants and their relations) have a "paired" version X* (with X**=X) -- this provides new results on the original objects.
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