Imaginary projections of polynomials
Abstract
We introduce the imaginary projection of a multivariate polynomial as the projection of the variety of onto its imaginary part, . Since a polynomial is stable if and only if , the notion offers a novel geometric view underlying stability questions of polynomials. We show that the connected components of the complement of the closure of the imaginary projections are convex, thus opening a central connection to the theory of amoebas and coamoebas. Building upon this, the paper establishes structural properties of the components of the complement, such as lower bounds on their maximal number, proves a complete classification of the imaginary projections of quadratic polynomials and characterizes the limit directions for polynomials of arbitrary degree.
Keywords
Cite
@article{arxiv.1602.02008,
title = {Imaginary projections of polynomials},
author = {Thorsten Jörgens and Thorsten Theobald and Timo de Wolff},
journal= {arXiv preprint arXiv:1602.02008},
year = {2018}
}
Comments
Revised version, 21 pages