The structure of obstructions to treewidth and pathwidth

AbstractIt is known that the class of graphs with treewidth (resp. pathwidth) bounded by a constant w can be characterized by a finite obstruction set obs(TW(w)) (resp. obs(PW(w))). These obstruction sets are known for w⩽3 so far. In this paper we give a structural characterization of graphs from obs(TW(w)) (resp. obs(PW(w))) with a fixed number of vertices in terms of subgraphs of the complement. Our approach also essentially simplifies known characterization of graphs from obs(TW(w)) (resp. obs(PW(w))) with (w+3) vertices.Also for any w⩾3 a graph from obs(TW(w))⧹obs(PW(w)) is constructed, that solves an open problem