Let A be a ring and X = s p e c ( A ) , the prime spectrum of A . Prove th

Karina Trujillo

Karina Trujillo

Answered question

2022-06-27

Let A be a ring and X = s p e c ( A ), the prime spectrum of A. Prove that X is quasi-compact.
Definition of quasi compact: each open covering of X has a finite subcovering of X.
It is enough to considering the covering in the basis { X f | f A }.
Let the set of { X f i | f i A , i I }. I is some index set. It is obvious that f i with i I generates the unit ideal. But why there exists a finite subset J of I such that f i with i J generates the unit ideal?

Answer & Explanation

livin4him777lf

livin4him777lf

Beginner2022-06-28Added 14 answers

Hint. f i i I = 1 if and only if 1 f i i I . What does an arbitrary element of f i i I look like and use the latter statement I gave.

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