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The Newton Polygon of a Rational Plane Curve

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The Newton Polygon of a Rational Plane Curve
The Newton polygon of the implicit equation of a rational plane curve is explicitly determined by the multiplicities of any of its parametrizations. We give an intersection-theoretical proof of this fact based on a refinement of the KuˇsnirenkoBernˇstein theorem. We apply this result to the determination of the Newton polygon of a curve parameterized by generic Laurent polynomials or by generic rational functions, with explicit genericity conditions. We also show that the variety of rational curves with given Newton polygon is unirational and we compute its dimension. As a consequence, we obtain that any convex lattice polygon with positive area is the Newton polygon of a rational plane curve.
Carlos D'Andrea, Martín Sombra
Added 29 Jan 2011
Updated 29 Jan 2011
Type Journal
Year 2010
Where MICS
Authors Carlos D'Andrea, Martín Sombra
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