Linear General Position (i.e. Arcs) for Zero-Dimensional Schemes Over a Finite Field
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Published:2021-08-10
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Volume:
Page:231-238
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ISSN:2705-1056
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Container-title:Contemporary Mathematics
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language:
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Short-container-title:Contemporary Mathematics
Abstract
We extend some of the usual notions of projective geometry over a finite field (arcs and caps) to the case of zero-dimensional schemes defined over a finite field Fq. In particular we prove that for our type of zero-dimensional arcs the maximum degree in any r-dimensional projective space is r(q + 1) and (if either r = 2 or q is odd) all the maximal cases are projectively equivalent and come from a rational normal curve.
Publisher
Universal Wiser Publisher Pte. Ltd