Let S be some base ring (a commutative ring or even just a field), and R a commutative r

vestpn

vestpn

Answered question

2022-05-21

Let S be some base ring (a commutative ring or even just a field), and R a commutative ring containing S which is finitely generated (as an algebra) over S. What conditions guarantee that any two minimal systems of generators of R over S have the same size?

Answer & Explanation

ketHideniw7

ketHideniw7

Beginner2022-05-22Added 6 answers

I think this almost never happens without grading. Consider the simple example with S = Q and R = Q [ X ]. Then { X } and { X 2 + X , X 2 } are minimal systems of generators of different sizes. Similar constructions should work for any algebra over a field with a transcendental element.
Of course if R / S is a finite extension of prime order, then any minimal system of generators is a singleton. But this fails as soon as we remove the condition of prime order: let S = Q and R = Q [ 2 , 3 ]. Then { 2 , 3 } and { 2 + 3 } are minimal systems of generators of different sizes.

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