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Topology of Algebraic Curves: and Factorization of Polynomials Hani Shaker
Topology of Algebraic Curves: and Factorization of Polynomials
Hani Shaker
Let C be the plane algebraic curve defined by the polynomial P in two variables with complex coefficients. The first question under investigations is, Is there some relation between the reducibility of P and number of singularities of the the plane curve C: P(x,y)=0. The answer to this question, we use topological and algebraic properties of the plane curves. The second question is, How many irreducible components the plane curve C: P(x,y)=0 has? The answer to this question is directly related to the study of the topology of the complement of C in the complex plane by using de Rham cohomology. The main problem is to extend this result for more variables and to obtain other related results on algebraic affine hypersurfaces.
| Media | Books Paperback Book (Book with soft cover and glued back) |
| Released | June 26, 2010 |
| ISBN13 | 9783838343921 |
| Publishers | LAP Lambert Academic Publishing |
| Pages | 60 |
| Dimensions | 225 × 4 × 150 mm · 107 g |
| Language | German |
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