Trivial topology

Details

• The only closed sets are the empty set and X.
• The only possible basis of X is.
• If X has more than one point, then since it is not T₀, it does not satisfy any of the higher T axioms either. In particular, it is not a Hausdorff space. Not being Hausdorff, X is not an order topology, nor is it metrizable.
• X is, however, regular, completely regular, normal, and completely normal; all in a rather vacuous way though, since the only closed sets are ∅ and X.
• X is compact and therefore paracompact, Lindelöf, and locally compact.
• Every function whose domain is a topological space and codomain X is continuous.
• X is path-connected and so connected.
• X is second-countable, and therefore is first-countable, separable and Lindelöf.
• All subspaces of X have the trivial topology.
• All quotient spaces of X have the trivial topology
• Arbitrary products of trivial topological spaces, with either the product topology or box topology, have the trivial topology.
• All sequences in X converge to every point of X. In particular, every sequence has a convergent subsequence, thus X is sequentially compact.
• The interior of every set except X is empty.
• The closure of every non-empty subset of X is X. Put another way: every non-empty subset of X is dense, a property that characterizes trivial topological spaces.
• * As a result of this, the closure of every open subset U of X is either ∅ or X. In particular, the closure of every open subset of X is again an open set, and therefore X is extremally disconnected.
• If S is any subset of X with more than one element, then all elements of X are limit points of S. If S is a singleton, then every point of X \ S is still a limit point of S.
• X is a Baire space.
• Two topological spaces carrying the trivial topology are homeomorphic iff they have the same cardinality.