"Minimal Degree Solutions of Polynomial Equations" by Graziano Gentili and Daniele C. Struppa
 

Minimal Degree Solutions of Polynomial Equations

Document Type

Article

Publication Date

1987

Abstract

We study the general Bezout equation A1Xl + ... + ArXr = C, for At, C in k[x , ..., x„], k = R or C, and we provide minimal degree solutions for it. The results are also extended to the case of A i, C distinguished polynomials in spaces of entire functions with growth conditions.

Comments

This article was originally published in Kybernetika, volume 23, issue 1, in 1987.

Peer Reviewed

1

Copyright

Institute of Information Theory and Automation

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