HOMEWORK 1 – 2017 Solve exercises 1 to 3 or 3 to 5. Exercise 1. Show that SSk = Sk+1 . Hint: Consider the map f : Sk × I → Sk+1 , where f(x, t) = (( 1 − (2t − 1)2)x, 2t − 1) Exercise 2. Suppose that the inclusion A → X is a cofibration and consider a map f : A → Y . Prove that the inclusion Y → X ∪f Y is also a cofibratin. Exercise 3. Prove: If X is a Hausdorff space, then its diagonal ∆ = {(x, x) ∈ X × X} is a closed subspace of X × X. Exercise 4. Let X be a Hausdorff space and A ⊆ X be its retract. Prove that A is closed. Hint: Use the previous exercise and the map X → X × X : x → (x, r(x)) where r: X → A is a retraction. Exercise 5. The consequence of the previous exercise is: If X is Hausdorff and A → X is a cofibration, then A is closed. Hint: X × I is Hausdorff. 1