Laurentiu G. Maxim, Jose Israel Rodriguez, Botong Wang
Published 2019-05-16Version 1
Two well studied invariants of a complex projective variety are the unit Euclidean distance degree and the generic Euclidean distance degree. These numbers give a measure of the algebraic complexity for "nearest" point problems of the algebraic variety. It is well known that the latter is an upper bound for the former. While this bound may be tight, many varieties appearing in optimization, engineering, statistics, and data science, have a significant gap between these two numbers. We call this difference the defect of the ED degree of an algebraic variety. In this paper we compute this defect by classical techniques in Singularity Theory, thereby deriving a new method for computing ED degrees of smooth complex projective varieties.
Sheaves of E-infinity algebras and applications to algebraic varieties and singular spaces
Rational homotopy of complex projective varieties with normal isolated singularities
Spaces of algebraic maps from real projective spaces to toric varieties
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