Tree-independence number of P5-free graphs with no large bicliques

Abstract

The tree-independence number of a graph is the minimum, over all tree-decompositions of the graph, of the maximum size of an independent set contained in a bag. Graph classes of bounded tree-independence number have strong structural and algorithmic properties, but the parameter can be unbounded even in quite restricted classes. In particular, the presence of an induced biclique K, forces tree-independence number at least . This leads to the question whether large induced bicliques are the only obstruction to bounded tree-independence number in natural hereditary classes. A conjecture of Dallard, Krnc, Kwon, Milanic, Munaro, Storgel, and Wiederrecht states that for all positive integers t and , every \Pt,K,\-free graph has bounded tree-independence number. We prove this conjecture for t=5 by showing that every \P5,K,\-free graph has tree-independence number at most 4. We also obtain related bounds for the weaker parameter of α-degeneracy.