A lattice on decreasing trees : the metasylvester lattice

Abstract

We introduce a new combinatorial structure: the metasylvester lattice on decreasing trees. It appears in the context of the m-Tamari lattices and other related m-generalizations. The metasylvester congruence has been recently introduced by Novelli and Thibon. We show that it defines a sublattice of the m-permutations where elements can be represented by decreasing labelled trees: the metasylvester lattice. We study the combinatorial properties of this new structure. In particular, we give different realizations of the lattice. The m-Tamari lattice is by definition a sublattice of our newly defined metasylvester lattice. It leads us to a new realization of the m-Tamari lattice, using certain chains of the classical Tamari lattice.