Abstract
AbstractThe starting point of this work is the fact that the class of evolution algebras over a fixed field is closed under tensor product. We prove that, under certain conditions, the tensor product is an evolution algebra if and only if every factor is an evolution algebra. Another issue arises about the inheritance of properties from the tensor product to the factors and conversely. For instance, nondegeneracy, irreducibility, perfectness and simplicity are investigated. The four-dimensional case is illustrative and useful to contrast conjectures, so we achieve a complete classification of four-dimensional perfect evolution algebras emerging as tensor product of two-dimensional ones. We find that there are four-dimensional evolution algebras that are the tensor product of two nonevolution algebras.
Funder
Junta de Andalucía
Ministerio de Ciencia e Innovación
Publisher
Springer Science and Business Media LLC
Reference29 articles.
1. Adams, W.W., Loustaunau, P.: An Introduction to Gröbner Bases. Graduate Studies in Mathematics Volume 3, American Mathematical Society, (1994)
2. Bardet, M., Faugère, J., Salvy, B.: On the complexity of the $$F_5$$ Gröbner basis algorithm. Journal of Symbolic Computation, Volume 70, 2015, Pages 49-70. https://doi.org/10.1016/j.jsc.2014.09.025
3. Brache, C., Barquero, D.M., González, C.M., Sánchez-Ortega, J.: Evolution algebras with one-dimensional square. arXiv:2103.01625
4. Bustamante, M.D., Mellon, P., Velasco, M.V.: Determining when an Algebra is an evolution algebra. Mathematics. 8, 1349 (2020)
5. Casado, Y.C.: Evolution algebras. Doctoral dissertation. Universidad de Málaga (2016). http://hdl.handle.net/10630/14175
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