Let X and Y be topological spaces, and let X × y be equipped with the product topology. Let yo E Y be fixed. Define the map f XXx Y by f(x) (x, yo) Prove that f is continuous, Let X and Y be top...
Topology Prove that if X and Y are connected topological spaces, then X x Y with the product topology is connected
l maps is a quotient map. 4, Let ( X,T ) be a topological space, let Y be a nonempty set, let f be a function that maps X onto Y, let U be the quotient topology on induced by f, and let (Z, V) be a topological space. Prove that a function g:Y Z is continuous if and only if go f XZ is continuous. l maps is a quotient map. 4, Let ( X,T ) be a topological...
3. Let X and Y be two topological spaces, and let AC X andBCY. T'hen there are two topologies on Ax B: (a) the subspace topology on A × B C X x Y, where X × Y is equipped with the product topology; (b) and the product topology on A x B, where A S X and BSY are equipped with the subspace topologies. Show that these two topologies are equal
Let X,Y be topological spaces, and f:X->Y a homeomorphism, I.e. f is one-to-one, onto, and f and f-1 are continuous. a.) Prove that if X is T4, so is Y. b.) Prove that if X is separable, then so is Y.
Suppose that f : X → Y is a continuous and surjective map between two topological spaces. Determine if the following statements are true or false. If true, prove the statement, if false, give a counter-example. (a) If X is path-connected, then so is Y. (b) If X is locally compact, then so is Y. (c) If X is Hausdorff, then so is Y.
2. Let (X, dx), (Y, dy) be two metric spaces, and f:X + Y a map. (a) Define what it means for the map f to be continuous at a point x E X. (b) Suppose W X is compact. Prove that then f(W) CY is compact.
a) Prove the following theorem: Let f:(x,d)-(Y,p) be bijective and continuous. Then f is a topological mapping iff: VUCX: U open = f(U) open in Y. b) Þrove the following theorem: Let f :(X,,d) (X ,d) and f:(X2,d)) (X 3,d) be topological mappings, Then f of, (the composition of the two functions) is topological.
(b) 4 Let F: X Y be a linear map between two normed spaces. Prove that F is continuous at Ojf and only if F is uniformly continuous on X.
Topology 3. Either prove or disprove each of the following statements: (a) If d and p map (X, d) X, then the identity topologically equivalent metrics (X, p) and its inverse are both continuous are two on (b) Any totally bounded metric space is compact. (c) The open interval (-r/2, n/2) is homeomorphic to R (d) If X and Y are homeomorphic metric spaces, then X is complete if and only if Y is complete (e) Let X and Y...
1- Prove or disprove. (X,Y are topological spaces, A, B are subsets of a topological space X, Ā denotes the closure of the set A, A' denotes the set of limit points of the set A, A° denotes the interior of the set A, A denotes the boundary of the set A.) (a) (AUB) = A'U Bº. (b) f-1(C') = (F-1(C))' for any continuous function f :X + Y and for all C CY. (c) If A° ), then A°=Ā.