Classifying all commutative <mi mathvariant="double-struck">R -algebras of matrices over <m

istupilo8k

istupilo8k

Answered question

2022-05-20

Classifying all commutative R-algebras of matrices over R?
I initially thought they were all isomorphic to some subring of the n × n diagonal matrices D R × × R, but this was wrong: Every commutative ring of matrices over R is isomorphic to the diagonals?. One counterexample is matrices of the form (using block matrix notation) [ α I 1 A 0 α I n 1 ] for some 1 × ( n 1 ) real matrix block A and some α R, which forms a commutative ring ( U , + , ).
Are there other counterexamples? Can we classify all such rings up to isomorphism?

Answer & Explanation

humanistex3

humanistex3

Beginner2022-05-21Added 9 answers

This would be equivalent to classifying all commutative R algebras of dimension n. It’s a basic fact that every n dimensional R algebra is isomorphic to a subring of M n ( R ).

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