Recently, Coté et al. [10] proposed an approach for solving the k-server problem on Hierchically Separated Trees (HSTs). In particular, they define a problem on a uniform metric, and show that if an algorithm with a certain refined guarantee exists for it, then one can obtain polylogarithmic (in diameter) competitive factors for the k-server problem on HSTs by solving this problem recursively. By designing such an algorithm for a two point metric, they obtained a logarithmic competitive algorithm for well-separated binary HSTs. Extending their result to uniform metrics on arbitrarily many points would imply a poly-logarithmic competitive algorithm for k-server on general HSTs (and hence general metrics) and is thus of major interest. Here, ...