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The purpose of this paper is to study the limiting distribution of special additive functionals on random planar maps, namely the number of occurrences of a given pattern. The main result is a central limit theorem for these pattern counts in the case of pattern with a simple boundary. The proof relies on a combination of analytic and combinatorial methods together with a moment method due to Gao and Wormald~GaoWormald. It is an important issue to handle the overlap structure of two pattern which is the main difficulty in the proof.
Drmota et al. (Sat,) studied this question.