References
- Kruskal J. Three-way arrays: rank and uniqueness of trilinear decompositions, with application to arithmetic complexity and statistics. Linear Algebra Appl. 1977;18:95–138.
- Rao W, Li D, Zhang J. A tensor-based approach to L-shaped arrays processing with enhanced degrees of freedom. IEEE Signal Proc Lett. 2018;25:1–5.
- Dersken H. Kruskal's uniqueness inequality is sharp. Linear Algebra Appl. 2013;438:708–712.
- Chiantini L, Ottaviani G, Vannieuwenhoven N. Effective criteria for specific identifiability of tensors and forms. SIAM J Matrix Anal Appl. 2017;38:656–681.
- Domanov I. Study of canonical polyadic decomposition of higher-order tensors [dissertation]. Leuven: KU Leuven, Arenberg Doctoral School; 2013.
- Domanov I, De Lathauwer L. Generic uniqueness conditions for the canonical polyadic decomposition and INDSCAL. SIAM J Matrix Anal Appl. 2015;36:1567–1589.
- Ballico E, Bernardi A. Decomposition of homogeneous polynomials with low rank. Math Zeit. 2012;271:1141–1149.
- Ballico E. An effective criterion for the additive decompositions of forms. Rend Istit Mat Trieste. 2019;51:1–12.
- Angelini E, Chiantini L, Vannieuwenhoven N. Identifiability beyond Kruskal's bound for symmetric tensors of degree 4. Rend Lincei Mat Appl. 2018;29:465–485.
- Angelini E, Chiantini L, Mazzon A. Identifiability for a class of symmetric tensors. Mediterr J Math. 2019;16:201.
- Angelini E, Chiantini L. On the identifiability of ternary forms. Linear Algebra Appl. 2020;599:36–65.
- Angelini E, Chiantini L. Minimality and uniqueness for decompositions of specific ternary forms. Math Comput. 2022;91:973–1006.
- Alexander J, Hirschowitz A. Polynomial interpolation in several variables. J Algebraic Geom. 1995;4:201–222.
- Chiantini L, Ciliberto C. Weakly defective varieties. Trans Amer Math Soc. 2002;354:151–178.
- Chiantini L, Ottaviani G, Vannieuwenhoven N. An algorithm for generic and low-rank specific identifiability of complex tensors. SIAM J Matrix Anal Appl. 2014;35:1265–1287.
- Mazzon A. On a geometric method for the identifiability of forms. BollUMI. 2020;13:137–154.
- Ferrand D. Courbes gauches et fibres de rang 2. C R Acad Sci Paris. 1975;281:345–347.
- Peskine C, Szpiro L. Liaison des variétés algébriques. Invent Math. 1974;26:271–302.
- Migliore J. Introduction to liaison theory and deficiency modules. Basel: Birkäuser; 1998. (Progress in mathematics; vol. 165).
- Eisenbud D. Commutative algebra, with a view towards algebraic geometry. Berlin: Springer; 1995. (Graduate texts in mathematics).
- Davis E, Geramita AV, Orecchia F. Gorenstein algebras and the Cayley-Bacharach theorem. Proc Amer Math Soc. 1985;93:593–597.
- Brun J. Les fibres de rang deux sur P2 et leur sections. Bull Soc Math France. 1980;108:457–473.
- Hartshorne R. Stable vector bundles of rank 2 in P3. Math Ann. 1978;238:229–280.
- Chiantini L, Ottaviani G. On generic identifiability of 3-tensors of small rank. SIAM J Matrix Anal Appl. 2012;33:1018–1037.
- Grayson D, Stillman M. Macaulay 2, a software system for research in algebraic geometry. Available from: http://www.math.uiuc.edu/Macaulay2
- Walter CH. The minimal free resolution of the homogeneous ideal of s general points in P4. Math Zeit. 1995;219:231–234.
- Chiantini L, Ottaviani G, Vannieuwenhoven N. On generic identifiability of symmetric tensors of subgeneric rank. Trans Amer Math Soc. 2017;369:4021–4042.
- Hartshorne R. Algebraic geometry. Berlin: Springer; 1992. (Graduate texts in math).
- Angelini E, Bocci C, Chiantini L. Real identifiability vs complex identifiability. Linear Multilinear Algebra. 2018;66:1257–1267.