Asymptotic normality for general subtree counts in conditioned Galton--Watson trees

Abstract

Let T denote a Galton--Watson tree with offspring distribution satisfying E() = 1, and let Tn be the Galton--Watson tree conditioned to have exactly n nodes. We show that, under a mild moment condition on , the number of occurrences of a fixed rooted plane tree t as a general subtree in Tn is asymptotically normal as n ∞, with both mean and variance linear in n. In addition, we prove that this limiting distribution is nondegenerate except for some special cases where the variance remains bounded. These results confirm a conjecture of Janson in recent work on the same topic. Finally, we present examples showing that if the proposed moment condition on is violated, the conclusion may fail.

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