Luke Oeding
Published 2016-08-08Version 1
Young flattenings, introduced by Landsberg and Ottaviani, give determinantal equations for secant varieties and provide lower bounds for border ranks of tensors. We find special monomial-optimal Young flattenings that provide the best possible lower bound for all monomials up to degree 6. For degree 7 and higher these flattenings no longer suffice for all monomials. To overcome this problem we introduce partial Young flattenings and use them to give a lower bound on the border rank of monomials which agrees with Landsberg and Teitler's upper bound.
Rank and border rank of real ternary cubics
Lower bounds on the rank and symmetric rank of real tensors
Geometric conditions for strict submultiplicativity of rank and border rank
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