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Some geometric properties of the solutions of complex multiaffine polynomials of degree three

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posted on 2024-11-15, 08:56 authored by Chayne PlanidenChayne Planiden, Hristo Sendov
In this paper we consider complex polynomials p(z) of degree three with distinct zeros and their polarization P(z1, z2, z3) with three complex variables. We show, through elementary means, that the variety P(z1, z2, z3)=0 is birationally equivalent to the variety z1z2z3+1=0. Moreover, the rational map certifying the equivalence is a simple Möbius transformation. The second goal of this note is to present a geometrical curiosity relating the zeros of z&P(z, z, zk) for k=1, 2, 3, where (z1, z2, z3) is arbitrary point on the variety P(z1, z2, z3)=0.

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Citation

Planiden, C. & Sendov, H. (2015). Some geometric properties of the solutions of complex multiaffine polynomials of degree three. Journal of Mathematical Analysis and Applications, 426 (1), 312-329.

Journal title

Journal of Mathematical Analysis and Applications

Volume

426

Issue

1

Pagination

312-329

Language

English

RIS ID

121662

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