Show that a compact subset of a Hausdorff space is closed in detail.

Give an example where X is not Hausdorff, and A is a compact subset of X,...

Give an example where X is not Hausdorff, and A is a compact subset of X, but A is not closed. Justify your claims with proof.

Show that the closed unit ball in a Hilbert space H is compact if and only...

Show that the closed unit ball in a Hilbert space H is compact if and only if H is finite dimensional. HINT: The closed unit ball must contain any basis.

Suppose K is a nonempty compact subset of a metric space X and x∈X. Show, there...

Suppose K is a nonempty compact subset of a metric space X and x∈X. Show, there is a nearest point p∈K to x; that is, there is a point p∈K such that, for all other q∈K, d(p,x)≤d(q,x). [Suggestion: As a start, let S={d(x,y):y∈K} and show there is a sequence (qn) from K such that the numerical sequence (d(x,qn)) converges to inf(S).] Let X=R^2 and T={(x,y):x^2+y^2=1}. Show, there is a point z∈X and distinct points a,b∈T that are nearest points to...

Show that if Y is G-delta set in X , and if X is a compact...

Show that if Y is G-delta set in X , and if X is a compact Hausdorff space, then Y is a Baire space in subspace topology.

(a) If G is an open set and K is a compact set with K ⊆...

(a) If G is an open set and K is a compact set with K ⊆ G, show that there exists a δ > 0 such that {x|dist(x, K) < δ} ⊆ G. (b) Find an example of an open subset G in a metric space X and a closed, non compact subset F of G such that there is no δ > 0 with {x|dist(x, F) < δ} ⊆ G

Suppose that E is a closed connected infinite subset of a metric space X. Prove that...

Suppose that E is a closed connected infinite subset of a metric space X. Prove that E is a perfect set.

Show that a subset Y of X is closed if Y is complete.

Show that a subset Y of X is closed if Y is complete.

"The closed unit ball of an infinite-dimensional Banach space is not compact", why this does not...

"The closed unit ball of an infinite-dimensional Banach space is not compact", why this does not contradict Alaoglu's theorem?

show that each subset of R is not compact by describing an open cover for it...

show that each subset of R is not compact by describing an open cover for it that has no finite subcover . [1,3) , also explain a little bit of finite subcover, what does it mean like a finite.

(2) If K is a subset of (X,d), show that K is compact if and only...

(2) If K is a subset of (X,d), show that K is compact if and only if every cover of K by relatively open subsets of K has a finite subcover.