Exercises
[0WY] Let \(π:[0,β)β [0,β)\) be a function that is continuous in zero, monotonically weakly increasing and with \(π(x)=0\iff x=0\). Show that \(\tilde d=πβ¦ d\) is still an ultrametric. Show that spaces \((X,d)\) \((X,\tilde d)\) have the same topology.
Compare with the exercise [0N1], notice that we do not require \(π\) to be subadditive.