1. Arbitrary triple systems admitting a multiplicative basis.
- Author
-
Calderón, Antonio J., Navarro, Francisco J., and Sánchez, José M.
- Subjects
ARBITRARY constants ,STEINER systems ,MATHEMATICAL analysis ,MATHEMATICAL models ,MATHEMATICAL optimization - Abstract
Let (T,⟨⋅,⋅,⋅⟩) be a triple system of arbitrary dimension, over an arbitrary base field 𝔽 and in which any identity on the triple product is not supposed. A basisofTis called multiplicative if for anyi,j,k ∈ I, we have thatfor somer ∈ I. We show that ifTadmits a multiplicative basis, then it decomposes as the orthogonal direct sumof well-described ideals admitting each one a multiplicative basis. Also, the minimality ofTis characterized in terms of the multiplicative basis and it is shown that, under a mild condition, the above direct sum is by the family of its minimal ideals. [ABSTRACT FROM PUBLISHER]
- Published
- 2017
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