Let k be any field and let A = k [ X , Y , Z ] / (

Jeramiah Campos

Jeramiah Campos

Answered question

2022-06-11

Let k be any field and let A = k [ X , Y , Z ] / ( X 2 Y 3 1 , X Z 1 ).
How can I find α , β k such that A is integral over B = k [ X + α Y + β Z ]?
For these values of α and β, how can I find concrete generators for A as a B-module?

Answer & Explanation

nuvolor8

nuvolor8

Beginner2022-06-12Added 32 answers

Denote by x , y , z the respective classes of X , Y , Z in A. Then A is finite over k [ x , z ] because y 3 = x 2 1. As x z = 1, we have k [ x , z ] finite over k [ x + z ] because x , z are both solutions of T 2 ( x + z ) T + 1. So A is finite hence integral over B := k [ X + Z ]. As
A = k [ x , z ] + k [ x , z ] y + k [ x , z ] y 2 , k [ x , z ] = k [ x + z ] + k [ x + z ] x + k [ x + z ] z ,
it is easy to find a set of generators of A as B-module.

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