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chapterNo Access
Number of points of non-absolutely irreducible hypersurfaces
- Robert Rolland
Algebraic Geometry and Its Applications01 Apr 2008
Preview Abstract
Let F_q be the finite field with q elements and n ≥ 2 an integer. We provide a bound on the number of 𝔽_q-rational points of the hypersurfaces in the affine space and in the projective space of dimension n, defined on 𝔽_q which are irreducible over 𝔽_q but non-absolutely irreducible.

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