Lower Bounds on Flow Sparsifiers with Steiner Nodes

Abstract

Given a large graph G with a set of its k vertices called terminals, a quality-q flow sparsifier is a small graph G' that contains the terminals and preserves all multicommodity flows between them up to some multiplicative factor q 1, called the quality. Constructing flow sparsifiers with good quality and small size (|V(G')|) has been a central problem in graph compression. The most common approach of constructing flow sparsifiers is contraction: first compute a partition of the vertices in V(G), and then contract each part into a supernode to obtain G'. When G' is only allowed to contain all terminals, the best quality is shown to be O( k/ k) and ( k/ k). In this paper, we show that allowing a few Steiner nodes does not help much in improving the quality. Specifically, there exist k-terminal graphs such that, even if we allow k· 2( k)(1) Steiner nodes in its contraction-based flow sparsifier, the quality is still (( k)0.3).