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相关论文: Pseudoknot RNA Structures with Arc-Length $\ge 3$

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In this paper we study $k$-noncrossing RNA structures with minimum arc-length 4 and at most $k-1$ mutually crossing bonds. Let ${\sf T}_{k}^{[4]}(n)$ denote the number of $k$-noncrossing RNA structures with arc-length $\ge 4$ over $n$…

组合数学 · 数学 2008-07-04 Hillary S. W. Han , Christian M. Reidys

In this paper we enumerate $k$-noncrossing RNA pseudoknot structures with given minimum arc- and stack-length. That is, we study the numbers of RNA pseudoknot structures with arc-length $\ge 3$, stack-length $\ge \sigma$ and in which there…

生物大分子 · 定量生物学 2007-12-04 Emma Y. Jin , Christian M. Reidys

In this paper we present the asymptotic enumeration of RNA structures with pseudoknots. We develop a general framework for the computation of exponential growth rate and the sub exponential factors for $k$-noncrossing RNA structures. Our…

生物大分子 · 定量生物学 2009-09-29 Emma Y. Jin , Christian M. Reidys

In this paper we derive the generating function of RNA structures with pseudoknots. We enumerate all $k$-noncrossing RNA pseudoknot structures categorized by their maximal sets of mutually intersecting arcs. In addition we enumerate…

组合数学 · 数学 2009-09-29 Emma Y. Jin , Jing Qin , Christian M. Reidys

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…

生物大分子 · 定量生物学 2007-12-04 Emma Y. Jin , Christian M. Reidys

In this paper we study $k$-noncrossing, canonical RNA pseudoknot structures with minimum arc-length $\ge 4$. Let ${\sf T}_{k,\sigma}^{[4]} (n)$ denote the number of these structures. We derive exact enumeration results by computing the…

组合数学 · 数学 2008-06-17 Gang Ma , Christian M. Reidys

A k-noncrossing RNA pseudoknot structure is a graph over $\{1,...,n\}$ without 1-arcs, i.e. arcs of the form (i,i+1) and in which there exists no k-set of mutually intersecting arcs. In particular, RNA secondary structures are 2-noncrossing…

组合数学 · 数学 2007-08-01 Emma Y. Jin , Christian M. Reidys

In this paper we compute the generating function of modular, $k$-noncrossing diagrams. A $k$-noncrossing diagram is called modular if it does not contains any isolated arcs and any arc has length at least four. Modular diagrams represent…

组合数学 · 数学 2019-10-15 Christian M. Reidys , Rita R. Wang , Y. Y. Zhao

In this paper we study the distribution of stacks in $k$-noncrossing, $\tau$-canonical RNA pseudoknot structures ($<k,\tau> $-structures). An RNA structure is called $k$-noncrossing if it has no more than $k-1$ mutually crossing arcs and…

组合数学 · 数学 2008-07-08 Hillary S. W. Han , Christian M. Reidys

There exists many complicated $k$-noncrossing pseudoknot RNA structures in nature based on some special conditions. The special characteristic of RNA structures gives us great challenges in researching the enumeration, prediction and the…

组合数学 · 数学 2020-11-23 Yangyang Zhao

In this paper we show how to express RNA tertiary interactions via the concepts of tangled diagrams. Tangled diagrams allow to formulate RNA base triples and pseudoknot-interactions and to control the maximum number of mutually crossing…

组合数学 · 数学 2007-12-10 Jing Qin , Christian M. Reidys

In this paper we present a selfcontained analysis and description of the novel {\it ab initio} folding algorithm {\sf cross}, which generates the minimum free energy (mfe), 3-noncrossing, $\sigma$-canonical RNA structure. Here an RNA…

组合数学 · 数学 2008-09-30 Fenix W. D. Huang , Wade W. J. Peng , Christian M. Reidys

In this paper we compute the limit distributions of the numbers of hairpin-loops, interior-loops and bulges in k-noncrossing RNA structures. The latter are coarse grained RNA structures allowing for cross-serial interactions, subject to the…

组合数学 · 数学 2009-12-03 Markus E. Nebel , Christian M. Reidys , Rita R. Wang

In this paper we study abstract shapes of $k$-noncrossing, $\sigma$-canonical RNA pseudoknot structures. We consider ${\sf lv}_k^{\sf 1}$- and ${\sf lv}_k^{\sf 5}$-shapes, which represent a generalization of the abstract $\pi'$- and…

组合数学 · 数学 2009-09-22 Christian M. Reidys , Rita R. Wang

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…

组合数学 · 数学 2022-04-14 Vincent Moulton , Taoyang Wu

We enumerate the number of RNA contact structures according to their genus, i.e. the topological character of their pseudoknots. By using a recently proposed matrix model formulation for the RNA folding problem, we obtain exact results for…

生物大分子 · 定量生物学 2009-11-10 G. Vernizzi , H. Orland , A. Zee

Recently several minimum free energy (MFE) folding algorithms for predicting the joint structure of two interacting RNA molecules have been proposed. Their folding targets are interaction structures, that can be represented as diagrams with…

组合数学 · 数学 2010-06-22 Thomas J. X. Li , Christian M. Reidys

An $k$-noncrossing RNA structure can be identified with an $k$-noncrossing diagram over $[n]$, which in turn corresponds to a vacillating tableaux having at most $(k-1)$ rows. In this paper we derive the limit distribution of irreducible…

生物大分子 · 定量生物学 2009-02-24 Emma Y. Jin , Christian M. Reidys

In this paper we analyze the length-spectrum of blocks in $\gamma$-structures. $\gamma$-structures are a class of RNA pseudoknot structures that plays a key role in the context of polynomial time RNA folding. A $\gamma$-structure is…

组合数学 · 数学 2018-06-13 Thomas J. X. Li , Christina S. Burris , Christian M. Reidys

An RNA sequence is a word over an alphabet on four elements $\{A,C,G,U\}$ called bases. RNA sequences fold into secondary structures where some bases match one another while others remain unpaired. Pseudoknot-free secondary structures can…

数据结构与算法 · 计算机科学 2018-03-28 Édouard Bonnet , Paweł Rzążewski , Florian Sikora
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