The monic rank
Abstract
We introduce the monic rank of a vector relative to an affine-hyperplane section of an irreducible Zariski-closed affine cone . We show that the monic rank is finite and greater than or equal to the usual -rank. We describe an algorithmic technique based on classical invariant theory to determine, in concrete situations, the maximal monic rank. Using this technique, we establish three new instances of a conjecture due to B. Shapiro which states that a binary form of degree is the sum of -th powers of forms of degree . Furthermore, in the case where is the cone of highest weight vectors in an irreducible representation---this includes the well-known cases of tensor rank and symmetric rank---we raise the question whether the maximal rank equals the maximal monic rank. We answer this question affirmatively in several instances.
Keywords
Cite
@article{arxiv.1901.11354,
title = {The monic rank},
author = {Arthur Bik and Jan Draisma and Alessandro Oneto and Emanuele Ventura},
journal= {arXiv preprint arXiv:1901.11354},
year = {2020}
}
Comments
26 pages, added a discussion on the monic rank for reducible cones