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Linearly disjoint

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In mathematics, algebras A, B over a field k inside some field extension Ω {\displaystyle \Omega } of k are said to be linearly disjoint over k if the following equivalent conditions are met:

  • (i) The map A k B A B {\displaystyle A\otimes _{k}B\to AB} induced by ( x , y ) x y {\displaystyle (x,y)\mapsto xy} is injective.
  • (ii) Any k-basis of A remains linearly independent over B.
  • (iii) If u i , v j {\displaystyle u_{i},v_{j}} are k-bases for A, B, then the products u i v j {\displaystyle u_{i}v_{j}} are linearly independent over k.

Note that, since every subalgebra of Ω {\displaystyle \Omega } is a domain, (i) implies A k B {\displaystyle A\otimes _{k}B} is a domain (in particular reduced). Conversely if A and B are fields and either A or B is an algebraic extension of k and A k B {\displaystyle A\otimes _{k}B} is a domain then it is a field and A and B are linearly disjoint. However, there are examples where A k B {\displaystyle A\otimes _{k}B} is a domain but A and B are not linearly disjoint: for example, A = B = k(t), the field of rational functions over k.

One also has: A, B are linearly disjoint over k if and only if the subfields of Ω {\displaystyle \Omega } generated by A , B {\displaystyle A,B} , resp. are linearly disjoint over k. (cf. Tensor product of fields)

Suppose A, B are linearly disjoint over k. If A A {\displaystyle A'\subset A} , B B {\displaystyle B'\subset B} are subalgebras, then A {\displaystyle A'} and B {\displaystyle B'} are linearly disjoint over k. Conversely, if any finitely generated subalgebras of algebras A, B are linearly disjoint, then A, B are linearly disjoint (since the condition involves only finite sets of elements.)

See also

References

  • P.M. Cohn (2003). Basic algebra


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