J. M. Landsberg, Zach Teitler
Published 2009-01-05, updated 2009-09-28Version 3
Motivated by questions arising in signal processing, computational complexity, and other areas, we study the ranks and border ranks of symmetric tensors using geometric methods. We provide improved lower bounds for the rank of a symmetric tensor (i.e., a homogeneous polynomial) obtained by considering the singularities of the hypersurface defined by the polynomial. We obtain normal forms for polynomials of border rank up to five, and compute or bound the ranks of several classes of polynomials, including monomials, the determinant, and the permanent.
Comments: v1: 22 pages; v2: 23 pages, numerous small improvements; v3: final version, accepted for publication in Found. Comp. Math
Rank and border rank of real ternary cubics
Geometric conditions for strict submultiplicativity of rank and border rank
A comparison of different notions of ranks of symmetric tensors
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