Clique-Width for Graph Classes Closed under Complementation.

Clique-width is an important graph parameter due to its algorithmic and structural properties. A graph class is hereditary if it can be characterized by a (not necessarily finite) set H of forbidden induced subgraphs. We study the boundedness of clique-width of hereditary graph classes closed under complementation. First, we extend the known classification for the vertical bar H vertical bar = 1 case by classifying the boundedness of clique-width for every set H of self-complementary graphs. We then completely settle the vertical bar H vertical bar = 2 case. In particular, we determine one new class of (H, (H) over bar)-free graphs of bounded clique-width (as a side effect, this leaves only five classes of (H-1 , H-2)-free graphs, for which it is not known whether their clique-width is bounded). Once we have obtained the classification of the vertical bar H vertical bar = 2 case, we research the effect of forbidding self-complementary graphs on the boundedness of clique-width. Surprisingly, we show that for every set F of self-complementary graphs on at least five vertices, the classification of the boundedness of clique-width for ({H, (H) over bar} U F)-free graphs coincides with the one for the vertical bar H vertical bar = 2 case if and only if F does not include the bull.