Suppose k is a field and A is a k -algebra of dimension no larger than 3. If A

Dayami Rose

Dayami Rose

Answered question

2022-06-15

Suppose k is a field and A is a k-algebra of dimension no larger than 3. If A is semi-simple, then A can be written as a direct sum of simple k-algebras. Further one can find A is commutative by exhausting all the cases.
Without the semi-simple condition, what can we say about A? Is it still commutative?

Answer & Explanation

Lisbonaid

Lisbonaid

Beginner2022-06-16Added 22 answers

The upper triangular 2 × 2 matrix ring over a field is three dimensional and noncommutative.
Here's what I mean, if you're not familiar with it:
{ [ a b 0 c ] a , b , c F }

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