On the triviality of the shocked map

Abstract

The (non-spanning) tree-decorated quadrangulation is a random pair formed by a quadrangulation and a subtree chosen uniformly over the set of pairs with prescribed size. In this paper we study the tree-decorated quadrangulation in the critical regime: when the number of faces of the map, f, is proportional to the square of the size of the tree. We show that with high probability in this regime, the diameter of the tree is between o(f1/4) and f1/4/α(f), for α >1. Thus after scaling the distances by f-1/4, the critical tree-decorated quadrangulation converges to a Brownian disk where the boundary has been identified to a point. These results imply the triviality of the shocked map: the metric space generated by gluing a Brownian disk with a continuous random tree.