Towards m-Cambrian Lattices

Abstract

For positive integers m and k, we introduce a family of lattices Ck(m) associated to the Cambrian lattice Ck of the dihedral group I2(k). We show that Ck(m) satisfies some basic properties of a Fuss-Catalan generalization of Ck, namely that Ck(1)=Ck and k(m)=Cat(m)(I2(k)). Subsequently, we prove some structural and topological properties of these lattices---namely that they are trim and EL-shellable---which were known for Ck before. Remarkably, our construction coincides in the case k=3 with the m-Tamari lattice of parameter 3 due to Bergeron and Pr\'eville-Ratelle. Eventually, we investigate this construction in the context of other Coxeter groups, in particular we conjecture that the lattice completion of the analogous construction for the symmetric group Sn and the long cycle (1\;2\;…\;n) is isomorphic to the m-Tamari lattice of parameter n.