We consider a class of pattern graphs on q ≥ 4 vertices that have q — 2 distinguished vertices with equal neighborhood in the remaining two vertices. Two pattern graphs in this class are siblings if they differ by some edges connecting the distinguished vertices. In particular, we show that if induced copies of siblings to a pattern graph in such a class are rare in the host graph then one can detect the pattern graph relatively efficiently. For example, we infer that if there are Nd induced copies of a diamond (i.e., a graph on four vertices missing a single edge to be complete) in the host graph, then an induced copy of the complete graph on four vertices, K_4, as well as an induced copy of the cycle on four vertices, C_4, can be deterministically detected in O(n~(2.75) + N_d) time. Note that the fastest known algorithm for K_4 and the fastest known deterministic algorithm for C_4 run in O(n~(3 257)) time. We also show that if there is a family of siblings whose induced copies in the host graph are rare then there are good chances to determine the numbers of occurrences of induced copies for all pattern graphs on q vertices relatively efficiently.
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