RNA-LEGO: Combinatorial Design of Pseudoknot RNA

Abstract

In this paper we enumerate k-noncrossing RNA pseudoknot structures with given minimum stack-length. We show that the numbers of k-noncrossing structures without isolated base pairs are significantly smaller than the number of all k-noncrossing structures. In particular we prove that the number of 3- and 4-noncrossing RNA structures with stack-length 2 is for large n given by 311.2470 4!n(n-1)...(n-4)2.5881n and 1.217· 107 n-21/2 3.0382n, respectively. We furthermore show that for k-noncrossing RNA structures the drop in exponential growth rates between the number of all structures and the number of all structures with stack-size 2 increases significantly. Our results are of importance for prediction algorithms for pseudoknot-RNA and provide evidence that there exist neutral networks of RNA pseudoknot structures.