The continuous image of a compact space is compact
Let
Proof
Without loss of generality, consider a continuous surjection
. Let π : π β π be an open cover of { π πΌ } πΌ β πΌ . It follows that π is an open cover of { π β 1 π πΌ } πΌ β πΌ with a finite subcover π . Therefore { π β 1 π πΌ π } π π = 1 is a finite subcover of { π π β 1 π πΌ π } π π = 1 = { π πΌ π } π π = 1 . π
It follows that compactness is a Topological property.