The Phase Limit Set of a Variety
arXiv:1106.0096
Abstract
A coamoeba is the image of a subvariety of a complex torus under the argument map to the real torus. We describe the structure of the boundary of the coamoeba of a variety, which we relate to its logarithmic limit set. Detailed examples of lines in three-dimensional space illustrate and motivate these results.
Final version, to appear in Journal of Algebra and Number Theory