Homotopa de T-algebras de rango 3
DOI:
https://doi.org/10.22199/S07160917.1994.0001.00004Keywords:
Homótopa, Topología algebraicaAbstract
En este artículo caracterizamos los idempotentes de la homótopa de la T-álgebra A = Ke ? U ? V de rango 3 y probamos que si su homótopa también es de rango 3, entonces A = Ke ? V.
References
[1] Costa R., Principal train algebras of rank 3 and dimension ? 5, Proc. Edinb. Math. Soc. 33, 61-70 (1990).
[2] Gonzalez S.,Homotope Algebra of Bernstein Algebra, Submitted.
[3] Ouattara M.,Sur les T-algebres de ]ardan, Linear Algebra and its Applications. 144,11-21 (1991).
[4] Thedy A.,Mutationen und polarisierte Fundamentalformel, Math. Annalen. 177, 235-246 (1968).
[2] Gonzalez S.,Homotope Algebra of Bernstein Algebra, Submitted.
[3] Ouattara M.,Sur les T-algebres de ]ardan, Linear Algebra and its Applications. 144,11-21 (1991).
[4] Thedy A.,Mutationen und polarisierte Fundamentalformel, Math. Annalen. 177, 235-246 (1968).
Published
2018-04-03
How to Cite
[1]
R. Baeza V. and R. Benavides G., “Homotopa de T-algebras de rango 3”, Proyecciones (Antofagasta, On line), vol. 13, no. 1, pp. 19-24, Apr. 2018.
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