Approximations of periodic functions to Rn by curvatures of closed curves
Abstract
We show that for any n real periodic functions f1,..., fn with the same period, such that fi>0 for i<n, and a real number e >0, there is a closed curve in Rn+1 with curvatures k1, ..., kn such that |ki(t)-fi(t)| < e for all i and t. This neither holds for closed curves in the hyperbolic space Hn+1, nor for parametric families of closed curves in Rn+1.
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