Border rank lower bounds for families of GL(V)-invariant tensors
Abstract
We give non-trivial lower bounds for the border rank of families of GL(V)-invariant tensors in U Sλ V Sμ V where U is V, Sym2V or 2V. We build on the techniques introduced by Wu, who used Young flattenings to obtain bounds for a family of tensors when U is V. We complete this case by resolving a conjecture introduced by Wu, using certain pure resolutions constructed by Ford-Levinson-Sam. We then use a theorem of Kostant to generalise this to Sym2 V and 2 V, and extend the number of examples of GL(V)-invariant tensors that are not of minimal border rank using Kempf collapsing.
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