Prove: A discrete metric space X is separable if and only if X is countable.

Give an example of a space that is separable, but not 2nd- countable. Prove that the...

Give an example of a space that is separable, but not 2nd- countable. Prove that the space you give is separable and prove it is not 2nd- countable

Please explain step by step. 3. (a) Assume X is a separable metric space, Y is...

Please explain step by step. 3. (a) Assume X is a separable metric space, Y is any subspace of X. Prove that Y is also separable. (b) Assume X is a compact metric space. Prove that X is separable

TOPOLOGY Prove that a subspace of a first countable space is first countable and that countable...

TOPOLOGY Prove that a subspace of a first countable space is first countable and that countable product (product topology) of first countable spaces is first countable.

Let (X,d) be a metric space which contains an infinite countable set Ewith the property x,y...

Let (X,d) be a metric space which contains an infinite countable set Ewith the property x,y ∈ E ⇒ d(x,y) = 1. (a) Show E is a closed and bounded subset of X. (b) Show E is not compact. (c) Explain why E cannot be a subset of Rn for any n.

Prove that the Gromov-Hausdorff distance between subsets X and Y of some metric space Z is...

Prove that the Gromov-Hausdorff distance between subsets X and Y of some metric space Z is 0 if and only if X = Y question related to Topological data analysis 2

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.

These problems concern the discrete metric. You can assume that the underlying space is R. (a)...

These problems concern the discrete metric. You can assume that the underlying space is R. (a) What does a convergent sequence look like in the discrete metric? (b) Show that the discrete metric yields a counterexample to the claim that every bounded sequence has a convergent subsequence. (c) What does an open set look like in the discrete metric? A closed set? (d) What does a (sequentially or topologically) compact set look like in the discrete metric? (e) Show that...

1. a) State the definition of a topological space. b) Prove that every metric space is...

1. a) State the definition of a topological space. b) Prove that every metric space is a topological space. c) Is the converse of part (b) true? That is, is every topological space a metric space? Justify your answer.

A topological space is totally disconnected if the connected components are all singletons. Prove that any...

A topological space is totally disconnected if the connected components are all singletons. Prove that any countable metric space is totally disconnected.

Show that if a topological space X has a countable sub-base, then X is second countable

Show that if a topological space X has a countable sub-base, then X is second countable