The approximate Loebl-Koml\'os-S\'os Conjecture II: The rough structure of LKS graphs

Abstract

This is the second of a series of four papers in which we prove the following relaxation of the Loebl-Komlos--Sos Conjecture: For every α>0 there exists a number k0 such that for every k>k0 every n-vertex graph G with at least (12+α)n vertices of degree at least (1+α)k contains each tree T of order k as a subgraph. In the first paper of the series, we gave a decomposition of the graph G into several parts of different characteristics; this decomposition might be viewed as an analogue of a regular partition for sparse graphs. In the present paper, we find a combinatorial structure inside this decomposition. In the last two papers, we refine the structure and use it for embedding the tree T.