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Interpolation of homogeneous polynomials over a finite field
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E Ballico
Published/Copyright:
May 17, 2006
Abstract
We study several interpolation problems for homogeneous polynomials over a finite field.
Key words: Interpolation problem; interpolation over a finite field; finite projective space; homogeneous polynomial
Received: 2004-01-29
Revised: 2005-03-10
Published Online: 2006-05-17
Published in Print: 2006-03-24
© Walter de Gruyter
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- Real algebraic morphisms on 2-dimensional conic bundles
- Interpolation of homogeneous polynomials over a finite field
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Gorenstein liaison in
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Keywords for this article
Interpolation problem;
interpolation over a finite field;
finite projective space;
homogeneous polynomial
Articles in the same Issue
- On ovoids of PG(3, q)
- Real algebraic morphisms on 2-dimensional conic bundles
- Interpolation of homogeneous polynomials over a finite field
-
Extensions of isomorphisms for affine Grassmannians over
- Geodesics in non-positively curved plane tessellations
- Elation generalized quadrangles of order (q, q2), q even, with a classical subquadrangle of order q
-
Gorenstein liaison in
- Flat manifolds, harmonic spinors, and eta invariants
- Cremona convexity, frame convexity and a theorem of Santaló
- Two-transitive ovals
