A 4/3 ratio approximation algorithm for the Tree Augmentation Problem by deferred local-ratio and climbing

Abstract

The Tree Augmentation Problem (TAP) is given a tree T=(V,ET) and additional set of links E on V× V, find F ⊂eq E such that T F is 2-edge-connected, and |F| is minimum. The problem is APX-hard r even in if links are only between leaves r. The best known approximation ratio for TAP is 1.393, due to Traub and Zenklusen~tr1 J.~ACM,~2025 using the relative greedy technique zel. We introduce a new technique called the deferred local ratio technique. In this technique, the disjointness of the local-ratio primal-dual type does not hold. The technique applies Set Cover problem under certain conditions (see Section lr). We use it provide a We use it to provide a 4/3 approximation algorithm for TAP. It is possible this technique will find future applications. The running time is The running time is O(m·n) time vaz, vaz1. Faster than tr1 LS and LP based algorithms as we do not enumeratestructures of size exp((f(1/ε)· n)). Nor do we scale and round. ed has an implementation kol that is extensively used in the industry.