On Sparse Covers of Minor Free Graphs, Low Dimensional Metric Embeddings, and other applications

Abstract

Given a metric space (X,dX), a (β,s,)-sparse cover is a collection of clusters C⊂eq P(X) with diameter at most , such that for every point x∈ X, the ball BX(x,β) is fully contained in some cluster C∈ C, and x belongs to at most s clusters in C. Our main contribution is to show that the shortest path metric of every Kr-minor free graphs admits (O(r),O(r2),)-sparse cover, and for every ε>0, (4+ε,O(1ε)r,)-sparse cover (for arbitrary >0). We then use this sparse cover to show that every Kr-minor free graph embeds into ∞O(1ε)r+1· n with distortion 3+ε (resp. into ∞O(r2)· n with distortion O(r)). Further, among other applications, this sparse cover immediately implies an algorithm for the oblivious buy-at-bulk problem in fixed minor free graphs with the tight approximation factor O( n) (previously nothing beyond general graphs was known).