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Artigo de periodico
Three representation types for systems of forms and linear maps (2021)
Alazemi, Abdullah ; Anđelić, Milica ; da Fonseca, Carlos M. ; Futorny, Vyacheslav ; Sergeichuk, Vladimir V.
Source: Mathematics. Unidade: IME
Subjects: ÁLGEBRA LINEAR, ANÉIS E ÁLGEBRAS ASSOCIATIVOS
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ABNT
ALAZEMI, Abdullah et al. Three representation types for systems of forms and linear maps. Mathematics, v. 9, n. art. 455, p. 1-12, 2021Tradução . . Disponível em: https://doi.org/10.3390/math9050455. Acesso em: 06 out. 2024.
APA
Alazemi, A., Anđelić, M., da Fonseca, C. M., Futorny, V., & Sergeichuk, V. V. (2021). Three representation types for systems of forms and linear maps. Mathematics, 9( art. 455), 1-12. doi:10.3390/math9050455
NLM
Alazemi A, Anđelić M, da Fonseca CM, Futorny V, Sergeichuk VV. Three representation types for systems of forms and linear maps [Internet]. Mathematics. 2021 ; 9( art. 455): 1-12.[citado 2024 out. 06 ] Available from: https://doi.org/10.3390/math9050455
Vancouver
Alazemi A, Anđelić M, da Fonseca CM, Futorny V, Sergeichuk VV. Three representation types for systems of forms and linear maps [Internet]. Mathematics. 2021 ; 9( art. 455): 1-12.[citado 2024 out. 06 ] Available from: https://doi.org/10.3390/math9050455
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
A citação é gerada automaticamente e pode não estar totalmente de acordo com as normas
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: 06 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. 06 ] 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. 06 ] Available from: https://doi.org/10.1016/j.laa.2020.12.009
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: 06 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. 06 ] 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. 06 ] Available from: https://doi.org/10.1016/j.laa.2020.12.005
Artigo de periodico
The exponential matrix: an explicit formula by an elementary method (2021)
Oliveira, Oswaldo Rio Branco de
Source: Real Analysis Exchange. Unidade: IME
Subjects: ÁLGEBRA LINEAR, ÁLGEBRA MULTILINEAR, EQUAÇÕES DIFERENCIAIS ORDINÁRIAS
A citação é gerada automaticamente e pode não estar totalmente de acordo com as normas
ABNT
OLIVEIRA, Oswaldo Rio Branco de. The exponential matrix: an explicit formula by an elementary method. Real Analysis Exchange, v. 46, n. 1, p. 99-106, 2021Tradução . . Disponível em: https://doi.org/10.14321/realanalexch.46.1.0099. Acesso em: 06 out. 2024.
APA
Oliveira, O. R. B. de. (2021). The exponential matrix: an explicit formula by an elementary method. Real Analysis Exchange, 46( 1), 99-106. doi:10.14321/realanalexch.46.1.0099
NLM
Oliveira ORB de. The exponential matrix: an explicit formula by an elementary method [Internet]. Real Analysis Exchange. 2021 ; 46( 1): 99-106.[citado 2024 out. 06 ] Available from: https://doi.org/10.14321/realanalexch.46.1.0099
Vancouver
Oliveira ORB de. The exponential matrix: an explicit formula by an elementary method [Internet]. Real Analysis Exchange. 2021 ; 46( 1): 99-106.[citado 2024 out. 06 ] Available from: https://doi.org/10.14321/realanalexch.46.1.0099
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
A citação é gerada automaticamente e pode não estar totalmente de acordo com as normas
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: 06 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. 06 ] 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. 06 ] 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
A citação é gerada automaticamente e pode não estar totalmente de acordo com as normas
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: 06 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. 06 ] 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. 06 ] Available from: https://doi.org/10.1016/j.laa.2020.09.018

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