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Artigo de periodico
Classification of linear operators satisfying (Au,v)=(u,Av) or (Au,Av)=(u,v) on a vector space with indefinite scalar product (2021)
Borges, Victor Senoguchi; Kashuba, Iryna ; Sergeichuk, Vladimir V. ; Sodré, Eduardo Ventilari ; Zaidan, André
Source: Linear Algebra and its Applications. Unidade: IME
Subjects: ÁLGEBRA LINEAR, ÁLGEBRA MULTILINEAR, FORMAS QUADRÁTICAS, FORMAS BILINEARES
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ABNT
BORGES, Victor Senoguchi et al. Classification of linear operators satisfying (Au,v)=(u,Av) or (Au,Av)=(u,v) on a vector space with indefinite scalar product. Linear Algebra and its Applications, v. 611, p. 118-134, 2021Tradução . . Disponível em: https://doi.org/10.1016/j.laa.2020.12.005. Acesso em: 04 out. 2024.
APA
Borges, V. S., Kashuba, I., Sergeichuk, V. V., Sodré, E. V., & Zaidan, A. (2021). Classification of linear operators satisfying (Au,v)=(u,Av) or (Au,Av)=(u,v) on a vector space with indefinite scalar product. Linear Algebra and its Applications, 611, 118-134. doi:10.1016/j.laa.2020.12.005
NLM
Borges VS, Kashuba I, Sergeichuk VV, Sodré EV, Zaidan A. Classification of linear operators satisfying (Au,v)=(u,Av) or (Au,Av)=(u,v) on a vector space with indefinite scalar product [Internet]. Linear Algebra and its Applications. 2021 ; 611 118-134.[citado 2024 out. 04 ] Available from: https://doi.org/10.1016/j.laa.2020.12.005
Vancouver
Borges VS, Kashuba I, Sergeichuk VV, Sodré EV, Zaidan A. Classification of linear operators satisfying (Au,v)=(u,Av) or (Au,Av)=(u,v) on a vector space with indefinite scalar product [Internet]. Linear Algebra and its Applications. 2021 ; 611 118-134.[citado 2024 out. 04 ] Available from: https://doi.org/10.1016/j.laa.2020.12.005
Trabalho de evento-anais periodico
Perturbation theory of matrix pencils through miniversal deformations (2021)
Futorny, Vyacheslav ; Klymchuk, Tetiana ; Klymenko, Olena; Sergeichuk, Vladimir V. ; Shvai, Nadiya
Source: Linear Algebra and its Applications. Conference titles: Linear Algebra without Borders - ILAS Conference. Unidade: IME
Subjects: ÁLGEBRA LINEAR, ÁLGEBRA MULTILINEAR
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ABNT
FUTORNY, Vyacheslav et al. Perturbation theory of matrix pencils through miniversal deformations. Linear Algebra and its Applications. New York: Elsevier. Disponível em: https://doi.org/10.1016/j.laa.2020.12.009. Acesso em: 04 out. 2024. , 2021
APA
Futorny, V., Klymchuk, T., Klymenko, O., Sergeichuk, V. V., & Shvai, N. (2021). Perturbation theory of matrix pencils through miniversal deformations. Linear Algebra and its Applications. New York: Elsevier. doi:10.1016/j.laa.2020.12.009
NLM
Futorny V, Klymchuk T, Klymenko O, Sergeichuk VV, Shvai N. Perturbation theory of matrix pencils through miniversal deformations [Internet]. Linear Algebra and its Applications. 2021 ; 614 455-499.[citado 2024 out. 04 ] Available from: https://doi.org/10.1016/j.laa.2020.12.009
Vancouver
Futorny V, Klymchuk T, Klymenko O, Sergeichuk VV, Shvai N. Perturbation theory of matrix pencils through miniversal deformations [Internet]. Linear Algebra and its Applications. 2021 ; 614 455-499.[citado 2024 out. 04 ] Available from: https://doi.org/10.1016/j.laa.2020.12.009
Artigo de periodico
Pairs of commuting nilpotent operators with one-dimensional intersection of kernels and matrices commuting with a Weyr matrix (2021)
Bondarenko, Vitalij M. ; Futorny, Vyacheslav ; Petravchuk, Anatolii P. ; Sergeichuk, Vladimir V.
Source: Linear Algebra and its Applications. Unidade: IME
Subjects: ÁLGEBRA LINEAR, ÁLGEBRA MULTILINEAR, ANÉIS E ÁLGEBRAS ASSOCIATIVOS
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ABNT
BONDARENKO, Vitalij M. et al. Pairs of commuting nilpotent operators with one-dimensional intersection of kernels and matrices commuting with a Weyr matrix. Linear Algebra and its Applications, v. 612, p. 188-205, 2021Tradução . . Disponível em: https://doi.org/10.1016/j.laa.2020.10.040. Acesso em: 04 out. 2024.
APA
Bondarenko, V. M., Futorny, V., Petravchuk, A. P., & Sergeichuk, V. V. (2021). Pairs of commuting nilpotent operators with one-dimensional intersection of kernels and matrices commuting with a Weyr matrix. Linear Algebra and its Applications, 612, 188-205. doi:10.1016/j.laa.2020.10.040
NLM
Bondarenko VM, Futorny V, Petravchuk AP, Sergeichuk VV. Pairs of commuting nilpotent operators with one-dimensional intersection of kernels and matrices commuting with a Weyr matrix [Internet]. Linear Algebra and its Applications. 2021 ; 612 188-205.[citado 2024 out. 04 ] Available from: https://doi.org/10.1016/j.laa.2020.10.040
Vancouver
Bondarenko VM, Futorny V, Petravchuk AP, Sergeichuk VV. Pairs of commuting nilpotent operators with one-dimensional intersection of kernels and matrices commuting with a Weyr matrix [Internet]. Linear Algebra and its Applications. 2021 ; 612 188-205.[citado 2024 out. 04 ] Available from: https://doi.org/10.1016/j.laa.2020.10.040
Artigo de periodico
Congruence of matrix spaces, matrix tuples, and multilinear maps (2021)
Belitskii, Genrich R.; Futorny, Vyacheslav ; Muzychuk, Mikhail ; Sergeichuk, Vladimir V.
Source: Linear Algebra and its Applications. Unidade: IME
Subjects: ÁLGEBRA LINEAR, FORMAS QUADRÁTICAS, ÁLGEBRA MULTILINEAR
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ABNT
BELITSKII, Genrich R. et al. Congruence of matrix spaces, matrix tuples, and multilinear maps. Linear Algebra and its Applications, v. 609, p. 317-331, 2021Tradução . . Disponível em: https://doi.org/10.1016/j.laa.2020.09.018. Acesso em: 04 out. 2024.
APA
Belitskii, G. R., Futorny, V., Muzychuk, M., & Sergeichuk, V. V. (2021). Congruence of matrix spaces, matrix tuples, and multilinear maps. Linear Algebra and its Applications, 609, 317-331. doi:10.1016/j.laa.2020.09.018
NLM
Belitskii GR, Futorny V, Muzychuk M, Sergeichuk VV. Congruence of matrix spaces, matrix tuples, and multilinear maps [Internet]. Linear Algebra and its Applications. 2021 ; 609 317-331.[citado 2024 out. 04 ] Available from: https://doi.org/10.1016/j.laa.2020.09.018
Vancouver
Belitskii GR, Futorny V, Muzychuk M, Sergeichuk VV. Congruence of matrix spaces, matrix tuples, and multilinear maps [Internet]. Linear Algebra and its Applications. 2021 ; 609 317-331.[citado 2024 out. 04 ] Available from: https://doi.org/10.1016/j.laa.2020.09.018
Artigo de periodico
Isometric and selfadjoint operators on a vector space with nondegenerate diagonalizable form (2020)
Caalim, Jonathan V. ; Futorny, Vyacheslav ; Sergeichuk, Vladimir V. ; Tanaka, Yu-ichi
Source: Linear Algebra and its Applications. Unidade: IME
Subjects: ÁLGEBRA LINEAR, FORMAS QUADRÁTICAS, ESPAÇOS COM PRODUTO INTERNO
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ABNT
CAALIM, Jonathan V. et al. Isometric and selfadjoint operators on a vector space with nondegenerate diagonalizable form. Linear Algebra and its Applications, v. 587, p. 92-110, 2020Tradução . . Disponível em: https://doi.org/10.1016/j.laa.2019.11.004. Acesso em: 04 out. 2024.
APA
Caalim, J. V., Futorny, V., Sergeichuk, V. V., & Tanaka, Y. -ichi. (2020). Isometric and selfadjoint operators on a vector space with nondegenerate diagonalizable form. Linear Algebra and its Applications, 587, 92-110. doi:10.1016/j.laa.2019.11.004
NLM
Caalim JV, Futorny V, Sergeichuk VV, Tanaka Y-ichi. Isometric and selfadjoint operators on a vector space with nondegenerate diagonalizable form [Internet]. Linear Algebra and its Applications. 2020 ; 587 92-110.[citado 2024 out. 04 ] Available from: https://doi.org/10.1016/j.laa.2019.11.004
Vancouver
Caalim JV, Futorny V, Sergeichuk VV, Tanaka Y-ichi. Isometric and selfadjoint operators on a vector space with nondegenerate diagonalizable form [Internet]. Linear Algebra and its Applications. 2020 ; 587 92-110.[citado 2024 out. 04 ] Available from: https://doi.org/10.1016/j.laa.2019.11.004
Artigo de periodico
Wildness for tensors (2019)
Futorny, Vyacheslav ; Grochow, Joshua A.; Sergeichuk, Vladimir V
Source: Linear Algebra and its Applications. Unidade: IME
Subjects: ANÉIS E ÁLGEBRAS ASSOCIATIVOS, TENSORES
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ABNT
FUTORNY, Vyacheslav e GROCHOW, Joshua A. e SERGEICHUK, Vladimir V. Wildness for tensors. Linear Algebra and its Applications, v. 566, p. 212-244, 2019Tradução . . Disponível em: https://doi.org/10.1016/j.laa.2018.12.022. Acesso em: 04 out. 2024.
APA
Futorny, V., Grochow, J. A., & Sergeichuk, V. V. (2019). Wildness for tensors. Linear Algebra and its Applications, 566, 212-244. doi:10.1016/j.laa.2018.12.022
NLM
Futorny V, Grochow JA, Sergeichuk VV. Wildness for tensors [Internet]. Linear Algebra and its Applications. 2019 ; 566 212-244.[citado 2024 out. 04 ] Available from: https://doi.org/10.1016/j.laa.2018.12.022
Vancouver
Futorny V, Grochow JA, Sergeichuk VV. Wildness for tensors [Internet]. Linear Algebra and its Applications. 2019 ; 566 212-244.[citado 2024 out. 04 ] Available from: https://doi.org/10.1016/j.laa.2018.12.022
Artigo de periodico
Wildness of the problems of classifying two-dimensional spaces of commuting linear operators and certain Lie algebras (2018)
Futorny, Vyacheslav ; Klymchuk, Tetiana; Petravchuk, Anatolii P; Sergeichuk, Vladimir V
Source: Linear Algebra and its Applications. Unidade: IME
Subjects: ÁLGEBRA LINEAR, ÁLGEBRA MULTILINEAR, ANÉIS E ÁLGEBRAS ASSOCIATIVOS, ANÉIS E ÁLGEBRAS NÃO ASSOCIATIVOS
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ABNT
FUTORNY, Vyacheslav et al. Wildness of the problems of classifying two-dimensional spaces of commuting linear operators and certain Lie algebras. Linear Algebra and its Applications, v. 536, p. 201-209, 2018Tradução . . Disponível em: https://doi.org/10.1016/j.laa.2017.09.019. Acesso em: 04 out. 2024.
APA
Futorny, V., Klymchuk, T., Petravchuk, A. P., & Sergeichuk, V. V. (2018). Wildness of the problems of classifying two-dimensional spaces of commuting linear operators and certain Lie algebras. Linear Algebra and its Applications, 536, 201-209. doi:10.1016/j.laa.2017.09.019
NLM
Futorny V, Klymchuk T, Petravchuk AP, Sergeichuk VV. Wildness of the problems of classifying two-dimensional spaces of commuting linear operators and certain Lie algebras [Internet]. Linear Algebra and its Applications. 2018 ; 536 201-209.[citado 2024 out. 04 ] Available from: https://doi.org/10.1016/j.laa.2017.09.019
Vancouver
Futorny V, Klymchuk T, Petravchuk AP, Sergeichuk VV. Wildness of the problems of classifying two-dimensional spaces of commuting linear operators and certain Lie algebras [Internet]. Linear Algebra and its Applications. 2018 ; 536 201-209.[citado 2024 out. 04 ] Available from: https://doi.org/10.1016/j.laa.2017.09.019
Artigo de periodico
Topological classification of systems of bilinear and sesquilinear forms (2017)
Fonseca, Carlos M.; Futorny, Vyacheslav ; Rybalkina, Tetiana; Sergeichuk, Vladimir V.
Source: Linear Algebra and its Applications. Unidade: IME
Subjects: ÁLGEBRA LINEAR, ÁLGEBRA MULTILINEAR, SISTEMAS DINÂMICOS, TEORIA ERGÓDICA
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ABNT
FONSECA, Carlos M. et al. Topological classification of systems of bilinear and sesquilinear forms. Linear Algebra and its Applications, v. 515, n. , p. 1-5, 2017Tradução . . Disponível em: https://doi.org/10.1016/j.laa.2016.11.012. Acesso em: 04 out. 2024.
APA
Fonseca, C. M., Futorny, V., Rybalkina, T., & Sergeichuk, V. V. (2017). Topological classification of systems of bilinear and sesquilinear forms. Linear Algebra and its Applications, 515( ), 1-5. doi:10.1016/j.laa.2016.11.012
NLM
Fonseca CM, Futorny V, Rybalkina T, Sergeichuk VV. Topological classification of systems of bilinear and sesquilinear forms [Internet]. Linear Algebra and its Applications. 2017 ; 515( ): 1-5.[citado 2024 out. 04 ] Available from: https://doi.org/10.1016/j.laa.2016.11.012
Vancouver
Fonseca CM, Futorny V, Rybalkina T, Sergeichuk VV. Topological classification of systems of bilinear and sesquilinear forms [Internet]. Linear Algebra and its Applications. 2017 ; 515( ): 1-5.[citado 2024 out. 04 ] Available from: https://doi.org/10.1016/j.laa.2016.11.012
Artigo de periodico
Specht’s criterion for systems of linear mappings (2017)
Futorny, Vyacheslav ; Horn, Roger A; Sergeichuk, Vladimir V
Source: Linear Algebra and its Applications. Unidade: IME
Subjects: ANÉIS E ÁLGEBRAS ASSOCIATIVOS, ÁLGEBRA LINEAR, ÁLGEBRA MULTILINEAR, TEORIA DA REPRESENTAÇÃO
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ABNT
FUTORNY, Vyacheslav e HORN, Roger A e SERGEICHUK, Vladimir V. Specht’s criterion for systems of linear mappings. Linear Algebra and its Applications, v. 519, p. 278-295, 2017Tradução . . Disponível em: https://doi.org/10.1016/j.laa.2017.01.006. Acesso em: 04 out. 2024.
APA
Futorny, V., Horn, R. A., & Sergeichuk, V. V. (2017). Specht’s criterion for systems of linear mappings. Linear Algebra and its Applications, 519, 278-295. doi:10.1016/j.laa.2017.01.006
NLM
Futorny V, Horn RA, Sergeichuk VV. Specht’s criterion for systems of linear mappings [Internet]. Linear Algebra and its Applications. 2017 ; 519 278-295.[citado 2024 out. 04 ] Available from: https://doi.org/10.1016/j.laa.2017.01.006
Vancouver
Futorny V, Horn RA, Sergeichuk VV. Specht’s criterion for systems of linear mappings [Internet]. Linear Algebra and its Applications. 2017 ; 519 278-295.[citado 2024 out. 04 ] Available from: https://doi.org/10.1016/j.laa.2017.01.006
Artigo de periodico
Generalization of Roth's solvability criteria to systems of matrix equations (2017)
Dmytryshyn, Andrii R. ; Futorny, Vyacheslav ; Klymchuk, Tetiana; Sergeichuk, Vladimir V
Source: Linear Algebra and its Applications. Unidade: IME
Subjects: ÁLGEBRA LINEAR, ÁLGEBRA MULTILINEAR
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ABNT
DMYTRYSHYN, Andrii R. et al. Generalization of Roth's solvability criteria to systems of matrix equations. Linear Algebra and its Applications, v. 527, p. 294-302, 2017Tradução . . Disponível em: https://doi.org/10.1016/j.laa.2017.04.011. Acesso em: 04 out. 2024.
APA
Dmytryshyn, A. R., Futorny, V., Klymchuk, T., & Sergeichuk, V. V. (2017). Generalization of Roth's solvability criteria to systems of matrix equations. Linear Algebra and its Applications, 527, 294-302. doi:10.1016/j.laa.2017.04.011
NLM
Dmytryshyn AR, Futorny V, Klymchuk T, Sergeichuk VV. Generalization of Roth's solvability criteria to systems of matrix equations [Internet]. Linear Algebra and its Applications. 2017 ; 527 294-302.[citado 2024 out. 04 ] Available from: https://doi.org/10.1016/j.laa.2017.04.011
Vancouver
Dmytryshyn AR, Futorny V, Klymchuk T, Sergeichuk VV. Generalization of Roth's solvability criteria to systems of matrix equations [Internet]. Linear Algebra and its Applications. 2017 ; 527 294-302.[citado 2024 out. 04 ] Available from: https://doi.org/10.1016/j.laa.2017.04.011
Artigo de periodico
Roth's solvability criteria for the matrix equations AX−XˆB=C and X−AXˆB=C over the skew field of quaternions with an involutive automorphism q↦qˆ (2016)
Futorny, Vyacheslav ; Klymchuk, Tatiana; Sergeichuk, Vladimir V
Source: Linear Algebra and its Applications. Unidade: IME
Subjects: ÁLGEBRA LINEAR, MATRIZES
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ABNT
FUTORNY, Vyacheslav e KLYMCHUK, Tatiana e SERGEICHUK, Vladimir V. Roth's solvability criteria for the matrix equations AX−XˆB=C and X−AXˆB=C over the skew field of quaternions with an involutive automorphism q↦qˆ. Linear Algebra and its Applications, v. 510, p. 246-258, 2016Tradução . . Disponível em: https://doi.org/10.1016/j.laa.2016.08.022. Acesso em: 04 out. 2024.
APA
Futorny, V., Klymchuk, T., & Sergeichuk, V. V. (2016). Roth's solvability criteria for the matrix equations AX−XˆB=C and X−AXˆB=C over the skew field of quaternions with an involutive automorphism q↦qˆ. Linear Algebra and its Applications, 510, 246-258. doi:10.1016/j.laa.2016.08.022
NLM
Futorny V, Klymchuk T, Sergeichuk VV. Roth's solvability criteria for the matrix equations AX−XˆB=C and X−AXˆB=C over the skew field of quaternions with an involutive automorphism q↦qˆ [Internet]. Linear Algebra and its Applications. 2016 ; 510 246-258.[citado 2024 out. 04 ] Available from: https://doi.org/10.1016/j.laa.2016.08.022
Vancouver
Futorny V, Klymchuk T, Sergeichuk VV. Roth's solvability criteria for the matrix equations AX−XˆB=C and X−AXˆB=C over the skew field of quaternions with an involutive automorphism q↦qˆ [Internet]. Linear Algebra and its Applications. 2016 ; 510 246-258.[citado 2024 out. 04 ] Available from: https://doi.org/10.1016/j.laa.2016.08.022
Artigo de periodico
Cycles of linear and semilinear mappings (2013)
Oliveira, Debora Duarte de; Futorny, Vyacheslav ; Klimchuk, Tatiana; kovalenko, Dmitry; Sergeichuk, Vladimir
Source: Linear Algebra and its Applications. Unidade: IME
Assunto: ÁLGEBRA LINEAR
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ABNT
OLIVEIRA, Debora Duarte de et al. Cycles of linear and semilinear mappings. Linear Algebra and its Applications, v. 438, n. 8, 2013Tradução . . Disponível em: https://doi.org/10.1016/j.laa.2012.12.023. Acesso em: 04 out. 2024.
APA
Oliveira, D. D. de, Futorny, V., Klimchuk, T., kovalenko, D., & Sergeichuk, V. (2013). Cycles of linear and semilinear mappings. Linear Algebra and its Applications, 438( 8). doi:10.1016/j.laa.2012.12.023
NLM
Oliveira DD de, Futorny V, Klimchuk T, kovalenko D, Sergeichuk V. Cycles of linear and semilinear mappings [Internet]. Linear Algebra and its Applications. 2013 ; 438( 8):[citado 2024 out. 04 ] Available from: https://doi.org/10.1016/j.laa.2012.12.023
Vancouver
Oliveira DD de, Futorny V, Klimchuk T, kovalenko D, Sergeichuk V. Cycles of linear and semilinear mappings [Internet]. Linear Algebra and its Applications. 2013 ; 438( 8):[citado 2024 out. 04 ] Available from: https://doi.org/10.1016/j.laa.2012.12.023
Artigo de periodico
Miniversal deformations of matrices of bilinear forms (2012)
Dmytryshyn, Andrii R. ; Futorny, Vyacheslav ; Sergeichuk, Vladimir V
Source: Linear Algebra and its Applications. Unidade: IME
Assunto: MATRIZES
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ABNT
DMYTRYSHYN, Andrii R. e FUTORNY, Vyacheslav e SERGEICHUK, Vladimir V. Miniversal deformations of matrices of bilinear forms. Linear Algebra and its Applications, v. 436, n. 7, p. 2670-2700, 2012Tradução . . Disponível em: https://doi.org/10.1016/j.laa.2011.11.010. Acesso em: 04 out. 2024.
APA
Dmytryshyn, A. R., Futorny, V., & Sergeichuk, V. V. (2012). Miniversal deformations of matrices of bilinear forms. Linear Algebra and its Applications, 436( 7), 2670-2700. doi:10.1016/j.laa.2011.11.010
NLM
Dmytryshyn AR, Futorny V, Sergeichuk VV. Miniversal deformations of matrices of bilinear forms [Internet]. Linear Algebra and its Applications. 2012 ; 436( 7): 2670-2700.[citado 2024 out. 04 ] Available from: https://doi.org/10.1016/j.laa.2011.11.010
Vancouver
Dmytryshyn AR, Futorny V, Sergeichuk VV. Miniversal deformations of matrices of bilinear forms [Internet]. Linear Algebra and its Applications. 2012 ; 436( 7): 2670-2700.[citado 2024 out. 04 ] Available from: https://doi.org/10.1016/j.laa.2011.11.010
Artigo de periodico
A criterion for unitary similarity of upper triangular matrices in general position (2011)
Farenick, Douglas; Futorny, Vyacheslav ; Gerasimovsky, V. I.; Sergeichuk, Vladimir V.; Shvai, Nadya
Source: Linear Algebra and its Applications. Unidade: IME
Assunto: MATRIZES
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ABNT
FARENICK, Douglas et al. A criterion for unitary similarity of upper triangular matrices in general position. Linear Algebra and its Applications, v. 435, n. 6, p. 1356-1369, 2011Tradução . . Disponível em: https://doi.org/10.1016/j.laa.2011.03.021. Acesso em: 04 out. 2024.
APA
Farenick, D., Futorny, V., Gerasimovsky, V. I., Sergeichuk, V. V., & Shvai, N. (2011). A criterion for unitary similarity of upper triangular matrices in general position. Linear Algebra and its Applications, 435( 6), 1356-1369. doi:10.1016/j.laa.2011.03.021
NLM
Farenick D, Futorny V, Gerasimovsky VI, Sergeichuk VV, Shvai N. A criterion for unitary similarity of upper triangular matrices in general position [Internet]. Linear Algebra and its Applications. 2011 ; 435( 6): 1356-1369.[citado 2024 out. 04 ] Available from: https://doi.org/10.1016/j.laa.2011.03.021
Vancouver
Farenick D, Futorny V, Gerasimovsky VI, Sergeichuk VV, Shvai N. A criterion for unitary similarity of upper triangular matrices in general position [Internet]. Linear Algebra and its Applications. 2011 ; 435( 6): 1356-1369.[citado 2024 out. 04 ] Available from: https://doi.org/10.1016/j.laa.2011.03.021

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