Posets and spaces of k-noncrossing RNA Structures

Abstract

RNA molecules are single-stranded analogues of DNA that can fold into various structures which influence their biological function within the cell. RNA structures can be modelled combinatorially in terms of a certain type of graph called an RNA diagram. In this paper we introduce a new poset of RNA diagrams Brf,k, r 0, k 1 and f 3, which we call the Penner-Waterman poset, and, using results from the theory of multitriangulations, we show that this is a pure poset of rank k(2f-2k+1)+r-f-1, whose geometric realization is the join of a simplicial sphere of dimension k(f-2k)-1 and an ((f+1)(k-1)-1)-simplex in case r=0. As a corollary for the special case k=1, we obtain a result due to Penner and Waterman concerning the topology of the space of RNA secondary structures. These results could eventually lead to new ways to investigate landscapes of RNA k-noncrossing structures.