I.e. the bilinear map/product is not only associative, but also commutative. I am looking for exampl

Shamar Reese

Shamar Reese

Answered question

2022-05-29

I.e. the bilinear map/product is not only associative, but also commutative. I am looking for examples of unital associative algebras, so they should be a vector space and a ring, not a vector space and a rng.One example, inspired by When is matrix multiplication commutative?, is the set of all diagonal matrices. Generalizing this, we could look at all n × n matrices over R that share a common eigenbasis (in the case of all diagonal matrices, this eigenbasis forms I n ), though they need not have the same eigenvalues R. Are there other examples?

Answer & Explanation

mseralge

mseralge

Beginner2022-05-30Added 10 answers

Another class of examples: continuous C-valued functions on some topological space. And various subalgebras of that where some restrictions are placed on the functions, e.g. analytic functions on some domain in C.
tinydancer27br

tinydancer27br

Beginner2022-05-31Added 3 answers

Yes, lots.
Take for example the polynomial algebra k [ x 1 , . . . , x n ] for a field k.
The complex numbers in particular are a commutative, associative algebra over R. The quaternions aren't though, because they're not commutative.
Subalgebras of both your examples and mine are also examples.

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