Inverse limits of various posets
Abstract
It is known when we call a poset P, a P-chain permutational poset, given a subset of permutations P of the symmetric group Sn. In this work, we use the same idea to study subsets of words of length n, that are not necessarily permutations, for example: especially when they are certain classes of restricted growth functions induced by set partitions in standard form over [n]=\1,2·s n\. Varying n only, and also varying n and k (the number of blocks of the set partitions) simultaneously, we can show that those posets form a projective system of trees and lattices (after giving a lattice structure in a natural way). These poset structures can be extended over signed restricted growth functions for standard type B set partitions over n=\-1,-2,·s n,0,1,2·s n\ as well. We investigate properties of the tree and lattice structures of these projective systems. In this scenario we further bring up some other posets like P-Partition posets of snake graph of continued fractions, Ascent lattices on Dyck Paths, certain type of lattice induced by generalisec fibonnaci number and Stanley order, lattices induced by non-crossing set partitions.
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