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A compactness criterion for real plane algebraic curves
Published/Copyright:
June 14, 2007
Abstract
Two sets of conditions are presented for the compactness of a real plane algebraic curve, one sufficient and one necessary, in terms of the Newton polygon of the defining polynomial.
Received: 2005-03-22
Published Online: 2007-06-14
Published in Print: 2007-05-23
© Walter de Gruyter
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Articles in the same Issue
- Induction Theorems and Isomorphism Conjectures for K- and L-Theory
- Parabolic Harnack inequality for the heat equation with inverse-square potential
- Asymptotic behavior of flows in networks
- Examples of miniversal deformations of infinity algebras
- Spinor L-functions, theta correspondence, and Bessel coefficients
- Relating Postnikov pieces with the Krull filtration: a spin-off of Serre's theorem
- A compactness criterion for real plane algebraic curves
