Topology Midterm 2 True/False
Unions of connected subsets are connected
False, draw two disjoint circles in R2.
Subspaces of Hausdorff spaces are Hausdorff
True
Every topological space is metrizable
False, T cofinite is not hausdorff, any nonhausdorff topology is not metrizable, T cobounded also works
If f:X to Y is continuous, and X is Hausdorff, then f(X) is Hausdorff
False, identity map from (X, T discrete) to (X, T indiscrete)
Intersections of connected subsets are connected
False, look at rational comb example, intersection is disjoint blobs.
Boundary(AxB) = (Boundary of A) x (Boundary of B)
False, take A=(0,1), B=(0,1), then boundary of AxB is the square, but boundary of A x boundary of B is the 4 corner points.
For A,B subsets of X, if AuB and AintersectB are connected, then both A and B are connected
False, take A=Q, B=R/Q. then R=AuB and AintersectB is empty, and R and empty are connected, but A and B are not connected.
Subspaces of connected spaces are connected
False, take Q as a subset of R. or just draw two disjoint circles in R2.
If {x} in X is closed for all x in X, then X is Hausdorff
False, take T cofinite
If f:X to Y is continuous, and T as a subset of Y is connected, then the inverse image of T is connected
False, take X to be two balls in R2, and f a constant function sending these to a single point. the single point is connected, but the inverse image is disconnected.
For S contained in A contained in X, the interior of S in A = the interior of S in X intersected with A
False, take X=R, A=Q, and S=Q. then interior of S in A is Q, interior of S in X is the empty set, empty set intersect with A is empty, not Q. or: take X=R, A=[0,1], S=[0,1/2). then S is open in A, so interior of S in A is S, but interior of S in R is (0,1/2), not S.
A function f:R to R is continuous iff its graph Gf is connected
False, take the squigly line graph example, whose function f:[0,inf) to R is defined by f(x)={0 if x=0, sin(1/x) if x is not 0} then f is not continuous but Gf is connected.
If A as a subset of X is connected, then Interior of A is also connected
False, take two balls in R2, one open one closed and intersecting at 1 point. then interior of this is two disjoint open balls, so disconnected.
If X is Hausdorff, then {x} in X is closed for all x in X
True, the complement is open
