Metric Estimates and Membership Complexity for Archimedean Amoebae and Tropical Hypersurfaces

Abstract

Given any complex Laurent polynomial f, Amoeba(f) is the image of its complex zero set under the coordinate-wise log absolute value map. We give an efficiently constructible polyhedral approximation, ArchtTrop(f), of Amoeba(f), and derive explicit upper and lower bounds, solely as a function of the number of monomial terms of f, for the Hausdorff distance between these two sets. We also show that deciding whether a given point lies in ArchTrop(f) is doable in polynomial-time, for any fixed dimension, unlike the corresponding problem for Amoeba(f), which is NP-hard already in one variable. ArchTrop(f) can thus serve as a canonical low order approximation to start any higher order iterative polynomial system solving algorithm, such as homotopy continuation. ArchTrop(f) also provides an Archimedean analogue of Kapranov's Non-Archimedean Amoeba Theorem and a higher-dimensional extension of earlier estimates of Mikhalkin and Ostrowski.