2017
DOI: 10.1080/03081087.2017.1347137
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Real identifiability vs. complex identifiability

Abstract: We report about the state of the art on complex and real generic identifiability of tensors, we describe some of our recent results obtained in [6] and we present perspectives on the subject.

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Cited by 19 publications
(28 citation statements)
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“…Perhaps the most interesting among these labels are those arising in open Euclidean subsets of the ambient real projective space P r (R), the typical labels; see §3 and §4. We highlight differences and similarities that we find between typical labels and typical ranks; the latter ones have been intensively studied in recent years; see for instance [1,4,5,7,10,21,22,23].…”
Section: Introductionmentioning
confidence: 58%
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“…Perhaps the most interesting among these labels are those arising in open Euclidean subsets of the ambient real projective space P r (R), the typical labels; see §3 and §4. We highlight differences and similarities that we find between typical labels and typical ranks; the latter ones have been intensively studied in recent years; see for instance [1,4,5,7,10,21,22,23].…”
Section: Introductionmentioning
confidence: 58%
“…The definition of typical rank is a key notion for real ranks of (real) algebraic varieties. Recently this topic has witnessed a tremendous amount of results; see for instance [1,4,7,5,10,21,22,23]. We extend some of them here to the setting of typical labels which will be defined in a moment.…”
Section: Typical Labelsmentioning
confidence: 94%
“…In this case, f is a single polynomial f (u) = f (u), and (1) becomes (2) f (u) = g 1 (v 1 u) + · · · + g r (v r u), since we can assume that w k = [1]. An example of (2) is shown in Figure 1.…”
Section: Model and Examplesmentioning
confidence: 99%
“…Hence, if the polynomial f admits a decomposition (2), then all the homogeneous parts f (d) can be decomposed as…”
Section: Lemma 18 (Terracini)mentioning
confidence: 99%
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