On maximally inflected hyperbolic curves
Abstract
In this note we study the distribution of real inflection points among the ovals of a real non-singular hyperbolic curve of even degree. Using Hilbert's method we show that for any integers d and r such that 4≤ r ≤ 2d2-2d, there is a non-singular hyperbolic curve of degree 2d in R2 with exactly r line segments in the boundary of its convex hull. We also give a complete classification of possible distributions of inflection points among the ovals of a maximally inflected non-singular hyperbolic curve of degree 6.
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