Spanners of Complete k-Partite Geometric Graphs

Abstract

We address the following problem: Given a complete k-partite geometric graph K whose vertex set is a set of n points in Rd, compute a spanner of K that has a ``small'' stretch factor and ``few'' edges. We present two algorithms for this problem. The first algorithm computes a (5+ε)-spanner of K with O(n) edges in O(n n) time. The second algorithm computes a (3+ε)-spanner of K with O(n n) edges in O(n n) time. The latter result is optimal: We show that for any 2 ≤ k ≤ n - (n n), spanners with O(n n) edges and stretch factor less than 3 do not exist for all complete k-partite geometric graphs.