On the ranks of homogeneous polynomials of degree at least 9 and border rank 5
Abstract
Let 
be a degree 
homogenous polynomial with border rank 
. We prove that it has rank at most 
and give better results when essentially depends on at most 
variables or there are other conditions on the scheme evincing the cactus and border rank of . We always assume that essentially depends on at most 
variables, because the other case was done by myself in Acta Math. Vietnam. 42 (2017), 509-531.
be a degree homogenous polynomial with border rank . We prove that it has rank at most and give better results when essentially depends on at most variables or there are other conditions on the scheme evincing the cactus and border rank of . We always assume that essentially depends on at most variables, because the other case was done by myself in Acta Math. Vietnam. 42 (2017), 509-531.DOI Code:
10.1285/i15900932v38n2p55
Keywords:
symmetric tensor rank; border rank; cactus rank
Full Text: PDF
