Decomposing graphs into stable and ordered parts
Abstract
Connections between structural graph theory and finite model theory recently gained a lot of attention. In this setting, many interesting question remain on the properties of hereditary dependent (NIP) classes of graphs, in particular related to first-order transductions. Motivated by Simon's decomposition theorem of dependent types into a stable part and a distal (order-like) part, we conjecture that every hereditary dependent class of graphs is transduction-equivalent to a hereditary dependent class of partially ordered graphs, where the cover graph of the partial order has bounded treewidth and the unordered graph is (edge) stable. In this paper, we consider the first non-trivial case (classes with bounded linear cliquewidth) and prove that the conjecture holds in a strong form, where the cover graph of the partial order has bounded pathwidth. Then, we extend our study to classes that admit bounded-size bounded linear cliquewidth covers, and prove that the conjecture holds for these classes, too.