Deterministic Dcomposition of Recursive Graph Classes

Abstract

The popular class of series-parallel graphs can be built recursively from single edges by combining smaller components via connections only at a fixed pair of vertices called terminals. This recursive construction property with a limited number of terminals is essential to the linear time solution of problems on these graphs. A second useful property of these graphs is that decomposition is deterministic with respect to the series-parallel rules. This implies that the parse-tree of decomposition (which is required by the algorithms) can be determined in a straightforward manner by repeatedly applying the decomposition rules. Subject to retaining these properties, we examine how far the series-parallel graphs can be generalized. Corollaries of our results yield the deterministic decomposition of the series-parallel and Halin graph classes.