Canonical RNA pseudoknot structures

Abstract

In this paper we study k-noncrossing, canonical RNA pseudoknot structures with minimum arc-length 4. Let Tk,σ[4] (n) denote the number of these structures. We derive exact enumeration results by computing the generating function Tk,σ[4](z)= Σn Tk,σ[4](n)zn and derive the asymptotic formulas Tk,3[4](n) ck n-(k-1)2-k-12 (γk,3[4])-n for k=3,...,9. In particular we have for k=3, T3,3[4](n) c3 n-5 2.0348n. Our results prove that the set of biophysically relevant RNA pseudoknot structures is surprisingly small and suggest a new structure class as target for prediction algorithms.