Nuclei of Normal Rational Curves
Abstract
A k-nucleus of a normal rational curve in PG(n,F) is the intersection over all k-dimensional osculating subspaces of the curve (k∈\-1,0,...,n-1\). It is well known that for characteristic zero all nuclei are empty. In case of characteristic p>0 and # F≥ n the number of non-zero digits in the representation of n+1 in base p equals the number of distinct nuclei. An explicit formula for the dimensions of k-nuclei is given for # F≥ k+1.
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