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JSC
2010
2010
On a generalization of Stickelberger's Theorem
We prove two versions of Stickelberger’s Theorem for positive dimensions and use them to compute the connected and irreducible components of a complex algebraic variety. If the variety is given by polynomials of degree ≤ d in n variables, then our algorithms run in parallel (sequential) time (n log d)O(1) (dO(n4 ) ). In the case of a hypersurface the complexity drops to O(n2 log2 d) (dO(n) ). In the proof of the last result we use the effective Nullstellensatz for two polynomials, which we also prove by very elementary methods. Key words: Stickelberger’s Theorem, connected components, irreducible components, effective Nullstellensatz
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| Added | 29 Jan 2011 |
| Updated | 29 Jan 2011 |
| Type | Journal |
| Year | 2010 |
| Where | JSC |
| Authors | Peter Scheiblechner |
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