k-Foldability of Words

Abstract

We extend results regarding a combinatorial model introduced by Black, Drellich, and Tymoczko (2017+) which generalizes the folding of the RNA molecule in biology. Consider a word on alphabet \A1, A1, …, Am, Am\ in which Ai is called the complement of Ai. A word w is foldable if can be wrapped around a rooted plane tree T, starting at the root and working counterclockwise such that one letter labels each half edge and the two letters labeling the same edge are complements. The tree T is called w-valid. We define a bijection between edge-colored plane trees and words folded onto trees. This bijection is used to characterize and enumerate words for which there is only one valid tree. We follow up with a characterization of words for which there exist exactly two valid trees. In addition, we examine the set R(n,m) consisting of all integers k for which there exists a word of length 2n with exactly k valid trees. Black, Drellich, and Tymoczko showed that for the nth Catalan number Cn, \Cn,Cn-1\⊂ R(n,1) but k∈R(n,1) for Cn-1<k<Cn. We describe a superset of R(n,1) in terms of the Catalan numbers by which we establish more missing intervals. We also prove R(n,1) contains all non-negative integer less than n+1.