Near-Optimal Vertex Fault-Tolerant Labels for Steiner Connectivity

Abstract

We present a compact labeling scheme for determining whether a designated set of terminals in a graph remains connected after any f (or less) vertex failures occur. An f-FT Steiner connectivity labeling scheme for an n-vertex graph G=(V,E) with terminal set U ⊂eq V provides labels to the vertices of G, such that given only the labels of any subset F ⊂eq V with |F| ≤ f, one can determine if U remains connected in G-F. The main complexity measure is the maximum label length. The special case U=V of global connectivity has been recently studied by Jiang, Parter, and Petruschka, who provided labels of n1-1/f · poly(f, n) bits. This is near-optimal (up to poly(f, n) factors) by a lower bound of Long, Pettie and Saranurak. Our scheme achieves labels of |U|1-1/f · poly(f, n) for general U ⊂eq V, which is near-optimal for any given size |U| of the terminal set. To handle terminal sets, our approach differs from Jiang et al. We use a well-structured Steiner tree for U produced by a decomposition theorem of Duan and Pettie, and bypass the need for Nagamochi-Ibaraki sparsification.