Almost covers of finite sets of points
Abstract
Let V ⊂eq Fn be a finite set of points in an affine space. A finite set of affine hyperplanes \H1, … ,Hm\ is said to be an almost cover of V and v, if their union j=1m Hj contains V \v\ but does not contain v. We give here a lower bound for the size of a minimal almost cover of V and v in terms of the size of V and the dimension n. We prove a generalization of Sziklai and Weiner's Theorem. Our simple proof is based on Gr\"obner basis theory.
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