The Container Selection Problem.

We introduce and study a network resource management problem that is a special case of non-metric k-median, naturally arising in cross platform scheduling and cloud computing. In the continuous d-dimensional selection problem, we are given a set C of input points in d-dimensional Euclidean space, for some d u003e= 2, and a budget k. An input p can be assigned to a container point c only if c dominates p in every dimension. The assignment cost is then equal to the L1-norm of the point. The goal is to find k points in the d-dimensional space, such that the total assignment cost for all input points is minimized. The discrete variant of the problem has one key distinction, namely, the points must be chosen from a given set F of points.For the continuous version, we obtain a polynomial time approximation scheme for any fixed dimension du003e= 2. On the negative side, we show that the problem is NP-hard for any du003e=3. We further show that the discrete version is significantly harder, as it is NP-hard to approximate without violating the budget k in any dimension du003e=3. Thus, we focus on obtaining bi-approximation algorithms. For d=2, the bi-approximation guarantee is (1+epsilon,3), i.e., for any epsilonu003e0, our scheme outputs a solution of size 3k and cost at most (1+epsilon) times the optimum. For fixed du003e2, we present a (1+epsilon,O((1/epsilon)log k)) bi-approximation algorithm.