Given two graphs G and H, we say that G contains H as an induced
minor if a graph isomorphic to H can be obtained from G by a sequence of
vertex deletions and edge contractions. We study the complexity of Graph
Isomorphism on graphs that exclude a fixed graph as an induced minor. More
precisely, we determine for every graph H that Graph Isomorphism is
polynomial-time solvable on H-induced-minor-free graphs or that it is
GI-complete. Additionally, we classify those graphs H for which
H-induced-minor-free graphs have bounded clique-width. These two results
complement similar dichotomies for graphs that exclude a fixed graph as an
induced subgraph, minor, or subgraph.Comment: 16 pages, 5 figures. An extended abstract of this paper previously
appeared in the proceedings of the 41st International Workshop on
Graph-Theoretic Concepts in Computer Science (WG 2015