A class of maximally singular sets for rational approximation
Abstract
We say that a subset of Pn(R) is maximally singular if its contains points with Q-linearly independent homogenous coordinates whose uniform exponent of simultaneous rational approximation is equal to 1, the maximal possible value. In this paper, we give a criterion which provides many such sets including Grassmannians. We also recover a result of the author and Roy about a class of quadratic hypersurfaces.
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