Components in meandric systems and the infinite noodle

Abstract

We investigate here the asymptotic behaviour of a large typical meandric system. More precisely, we show the quenched local convergence of a random uniform meandric system Mn on 2n points, as n → ∞, towards the infinite noodle introduced by Curien, Kozma, Sidoravicius and Tournier ( Ann. Inst. Henri Poincar\'e D, 6(2):221--238, 2019). As a consequence, denoting by cc( Mn) the number of connected components of Mn, we prove the convergence in probability of cc(Mn)/n to some constant , answering a question raised independently by Goulden--Nica--Puder ( Int. Math. Res. Not., 2020(4):983--1034, 2020) and Kargin ( Journal of Statistical Physics, 181(6):2322--2345, 2020). This result also provides information on the asymptotic geometry of the Hasse diagram of the lattice of non-crossing partitions. Finally, we obtain expressions of the constant as infinite sums over meanders, which allows us to compute upper and lower approximations of .