We prove that the general symmetric tensor in SdCn+1 of rank r is identifiable, provided that r is smaller than the generic rank. That is, its Waring decomposition as a sum of r powers of linear forms is unique. Only three exceptional cases arise, all of which were known in the literature. Our original contribution regards the case of cubics (d = 3), while for d ≥ 4 we rely on known results on weak defectivity by Ballico, Ciliberto, Chiantini, and Mella.
Chiantini, L., Ottaviani, G., Vannieuwenhoven, N. (2017). On generic identifiability of symmetric tensors of subgeneric rank. TRANSACTIONS OF THE AMERICAN MATHEMATICAL SOCIETY, 369(6), 4021-4042 [10.1090/tran/6762].
On generic identifiability of symmetric tensors of subgeneric rank
Chiantini, Luca;
2017-01-01
Abstract
We prove that the general symmetric tensor in SdCn+1 of rank r is identifiable, provided that r is smaller than the generic rank. That is, its Waring decomposition as a sum of r powers of linear forms is unique. Only three exceptional cases arise, all of which were known in the literature. Our original contribution regards the case of cubics (d = 3), while for d ≥ 4 we rely on known results on weak defectivity by Ballico, Ciliberto, Chiantini, and Mella.
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Descrizione: DOI: https://doi.org/10.1090/tran/6762
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https://hdl.handle.net/11365/1006256