Need a clarification of the proof that the prime ideal space of a distributive bounded lattice is co

Hana Medina

Hana Medina

Answered question

2022-06-04

Need a clarification of the proof that the prime ideal space of a distributive bounded lattice is compact
Let L be a bounded distributive lattice, then the prime ideal space I p ( L ) ; τ is compact. τ is the topology whose basis is B = { X b ( X X c ) : b , c L }, with X a = { I I p ( L ) : a I }.
We want to prove that the subbasis S = { X b : b L } { X X c : c L } satisfies Alexander's Lemma. Let U := { X b : b A 0 } { X X c : c A 1 }, a open cover of I p ( L ).
Let J be the ideal generated by A 0 and G the filter generated by A 1 . It is easy to prove that J G . So J G and let a J G; if A 0 and A 1 are both non-empty, there exist b 1 , , b j A 0 and c 1 , , c k A 1 s.t. c 1 c k a b 1 b j , whence X = X 1 = X b 1 X b j ( X X c 1 ) ( X X c k )
What escapes me is why we can write 1 in that way if J G ?

Answer & Explanation

try100hkda8mm

try100hkda8mm

Beginner2022-06-05Added 3 answers

Step 1
To show that X = X b 1 X b j ( X X c 1 ) ( X X c k ) ,, pick a prime ideal I of L.
Given that c 1 c k b 1 b j ,, then either b 1 b j I or c 1 c k I ..
Step 2
In the first case, there is i 0 with 1 i 0 j such that b i 0 I (because I is an ideal), whence I X b i 0 . In the second case, there is i 1 such that 1 i 1 k and c i 1 I (because I is prime), whence I X c i 1 and therefore I X X c i 1 .

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