Suppose X is a normed linear space with a norm || · ||. Show X is...

Show that a norm on a vector space X is a sub linear functional on X.

Show that a norm on a vector space X is a sub linear functional on X.

Show that the Frobenius norm is indeed a norm on the linear space of matrices.

Show that the Frobenius norm is indeed a norm on the linear space of matrices.

Let X be a normed linear space. Let X* be its dual space with the usual...

Let X be a normed linear space. Let X* be its dual space with the usual dual norm ||T|| = sup{ |T(x)| / ||x|| : x not equal to 0}. Show that X* is always complete. Hint: If Tn is a Cauchy sequence in X*, show that i) Tn(x) converges for each fixed x in X, ii) the resulting limits define a bounded linear functional T on X, and iii) the sequences Tn converges to T in the norm of...

Suppose (an), a sequence in a metric space X, converges to L ∈ X. Show, if...

Suppose (an), a sequence in a metric space X, converges to L ∈ X. Show, if σ : N → N is one-one, then the sequence (bn = aσ(n))n also converges to L.

Suppose X and Y are connected subsets of metric space X, the X intersection Y is...

Suppose X and Y are connected subsets of metric space X, the X intersection Y is not empty. show Y union X is connected.

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...

is about metric spaces: Let X be a metric discret space show that a sequence x_n...

is about metric spaces: Let X be a metric discret space show that a sequence x_n in X converge to l in X iff x_n is constant exept for a finite number of points.

Let (X, d) be a compact metric space and let A ⊆ X. Suppose that A...

Let (X, d) be a compact metric space and let A ⊆ X. Suppose that A is not compact. Prove that there exists a continuous function f : A → R, from (A, d) to (R, d|·|), which is not uniformly continuous.

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.

Given a metric space Z and F⊆X⊆Z define F is relatively closed in X. Show, F...

Given a metric space Z and F⊆X⊆Z define F is relatively closed in X. Show, F is relatively closed in X if and only if there is a closed set C⊆Z such that F=C∩X.