Author: "Jin, Emma Y." - Searchworks@Jio Institute Digital Library Search Results

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24 results on '"Jin, Emma Y."'

1. The evolution of random reversal graph

Author: Jin, Emma Y. and Reidys, Christian M.
Subjects: Mathematics - Combinatorics, Mathematics - Probability, 05A16
Abstract: The random reversal graph offers new perspectives, allowing to study the connectivity of genomes as well as their most likely distance as a function of the reversal rate. Our main result shows that the structure of the random reversal graph changes dramatically at $\lambda_n=1/\binom{n+1}{2}$. For $\lambda_n=(1-\epsilon)/\binom{n+1}{2}$, the random graph consists of components of size at most $O(n\ln(n))$ a.s. and for $(1+\epsilon)/\binom{n+1}{2}$, there emerges a unique largest component of size $\sim \wp(\epsilon) \cdot 2^n\cdot n$!$ a.s.. This "giant" component is furthermore dense in the reversal graph., Comment: 5 pages with supplementary materials 13 pages
Published: 2010

2. Random induced subgraphs of Cayley graphs induced by transpositions

Author: Jin, Emma Y. and Reidys, Christian M.
Subjects: Mathematics - Probability, Mathematics - Combinatorics, 05C40
Abstract: In this paper we study random induced subgraphs of Cayley graphs of the symmetric group induced by an arbitrary minimal generating set of transpositions. A random induced subgraph of this Cayley graph is obtained by selecting permutations with independent probability, $\lambda_n$. Our main result is that for any minimal generating set of transpositions, for probabilities $\lambda_n=\frac{1+\epsilon_n}{n-1}$ where $n^{-{1/3}+\delta}\le \epsilon_n<1$ and $\delta>0$, a random induced subgraph has a.s. a unique largest component of size $\wp(\epsilon_n)\frac{1+\epsilon_n}{n-1}n!$, where $\wp(\epsilon_n)$ is the survival probability of a specific branching process., Comment: 18 pages, 1 figure
Published: 2009

3. Irreducibility in RNA structures

Author: Jin, Emma Y. and Reidys, Christian M.
Subjects: Quantitative Biology - Biomolecules, Mathematics - Combinatorics, Quantitative Biology - Quantitative Methods, 05A16
Abstract: In this paper we study irreducibility in RNA structures. By RNA structure we mean RNA secondary as well as RNA pseudoknot structures. In our analysis we shall contrast random and minimum free energy (mfe) configurations. We compute various distributions: of the numbers of irreducible substructures, their locations and sizes, parameterized in terms of the maximal number of mutually crossing arcs, $k-1$, and the minimal size of stacks $\sigma$. In particular, we analyze the size of the largest irreducible substructure for random and mfe structures, which is the key factor for the folding time of mfe configurations., Comment: 17 figures 28 pages
Published: 2009

4. On the decomposition of $k$-noncrossing RNA structures

Author: Jin, Emma Y. and Reidys, Christian M.
Subjects: Quantitative Biology - Biomolecules, Mathematics - Combinatorics, Quantitative Biology - Quantitative Methods, 05A16
Abstract: 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 substructures via studying their corresponding vacillating tableaux. Our main result proves, that the limit distribution of the numbers of irreducible substructures in $k$-noncrossing, $\sigma$-canonical RNA structures is determined by the density function of a $\Gamma(-\ln\tau_k,2)$-distribution for some $\tau_k<1$., Comment: 15 figures, 22 pages
Published: 2009

5. Asymptotic analysis of $k$-noncrossing matchings

Author: Jin, Emma Y., Reidys, Christian M., and Wang, Rita R.
Subjects: Mathematics - Combinatorics, Mathematics - General Mathematics, 05A16
Abstract: In this paper we study $k$-noncrossing matchings. A $k$-noncrossing matching is a labeled graph with vertex set $\{1,...,2n\}$ arranged in increasing order in a horizontal line and vertex-degree 1. The $n$ arcs are drawn in the upper halfplane subject to the condition that there exist no $k$ arcs that mutually intersect. We derive: (a) for arbitrary $k$, an asymptotic approximation of the exponential generating function of $k$-noncrossing matchings $F_k(z)$. (b) the asymptotic formula for the number of $k$-noncrossing matchings $f_{k}(n) \sim c_k n^{-((k-1)^2+(k-1)/2)} (2(k-1))^{2n}$ for some $c_k>0$., Comment: 19 pages and 1 figure
Published: 2008

6. $k$-noncrossing RNA structures with arc-length $\ge 3$

Author: Jin, Emma Y. and Reidys, Christian M.
Subjects: Quantitative Biology - Biomolecules
Abstract: 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 are at most $k-1$ mutually crossing bonds, denoted by ${\sf T}_{k,\sigma}^{[3]}(n)$. In particular we prove that the numbers of 3, 4 and 5-noncrossing RNA structures with arc-length $\ge 3$ and stack-length $\ge 2$ satisfy ${\sf T}_{3,2}^{[3]}(n)^{}\sim K_3 n^{-5} 2.5723^n$, ${\sf T}^{[3]}_{4,2}(n)\sim K_4 n^{-{21/2}} 3.0306^n$, and ${\sf T}^{[3]}_{5,2}(n)\sim K_5 n^{-18} 3.4092^n$, respectively, where $K_3,K_4,K_5$ are constants. Our results are of importance for prediction algorithms for RNA pseudoknot structures., Comment: 17 pages, 4 figures
Published: 2007

7. RNA-LEGO: Combinatorial Design of Pseudoknot RNA

Author: Jin, Emma Y. and Reidys, Christian M.
Subjects: Quantitative Biology - Biomolecules
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 $\ge 2$ is for large $n$ given by $311.2470 \frac{4!}{n(n-1)...(n-4)}2.5881^n$ and $1.217\cdot 10^{7} n^{-{21/2}} 3.0382^n$, 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 $\ge 2$ 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., Comment: 21 pages and 8 figures
Published: 2007

8. On $k$-noncrossing partitions

Author: Jin, Emma Y., Qin, Jing, and Reidys, Christian M.
Subjects: Mathematics - Combinatorics, Mathematics - Representation Theory, 06A07
Abstract: In this paper we prove a duality between $k$-noncrossing partitions over $[n]=\{1,...,n\}$ and $k$-noncrossing braids over $[n-1]$. This duality is derived directly via (generalized) vacillating tableaux which are in correspondence to tangled-diagrams \cite{Reidys:07vac}. We give a combinatorial interpretation of the bijection in terms of the contraction of arcs of tangled-diagrams. Furthermore it induces by restriction a bijection between $k$-noncrossing, 2-regular partitions over $[n]$ and $k$-noncrossing braids without isolated points over $[n-1]$. Since braids without isolated points correspond to enhanced partitions this allows, using the results of \cite{MIRXIN}, to enumerate 2-regular, 3-noncrossing partitions., Comment: 5 pages; 3 figures
Published: 2007

9. Pseudoknot RNA Structures with Arc-Length $\ge 3$

Author: Jin, Emma Y. and Reidys, Christian M.
Subjects: Mathematics - Combinatorics, Quantitative Biology - Biomolecules, 05A16
Abstract: In this paper we study $k$-noncrossing RNA structures with arc-length $\ge 3$, i.e. RNA molecules in which for any $i$, the nucleotides labeled $i$ and $i+j$ ($j=1,2$) cannot form a bond and in which there are at most $k-1$ mutually crossing arcs. Let ${\sf S}_{k,3}(n)$ denote their number. Based on a novel functional equation for the generating function $\sum_{n\ge 0}{\sf S}_{k,3}(n)z^n$, we derive for arbitrary $k\ge 3$ exponential growth factors and for $k=3$ the subexponential factor. Our main result is the derivation of the formula ${\sf S}_{3,3}(n) \sim \frac{6.11170\cdot 4!}{n(n-1)...(n-4)} 4.54920^n$., Comment: 18 pages, 4 figures
Published: 2007

10. Central and Local Limit Theorems for RNA Structures

Author: Jin, Emma Y. and Reidys, Christian M.
Subjects: Mathematics - Combinatorics, Quantitative Biology - Quantitative Methods, 68R05
Abstract: 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 RNA structures. In this paper we prove a central and a local limit theorem for the distribution of the numbers of 3-noncrossing RNA structures over n nucleotides with exactly h bonds. We will build on the results of \cite{Reidys:07rna1} and \cite{Reidys:07rna2}, where the generating function of k-noncrossing RNA pseudoknot structures and the asymptotics for its coefficients have been derived. The results of this paper explain the findings on the numbers of arcs of RNA secondary structures obtained by molecular folding algorithms and predict the distributions for k-noncrossing RNA folding algorithms which are currently being developed., Comment: 25 pages, 5 figures
Published: 2007

11. Asymptotic Enumeration of RNA Structures with Pseudoknots

Author: Jin, Emma Y. and Reidys, Christian M.
Subjects: Quantitative Biology - Biomolecules, Mathematics - Combinatorics, 05A16
Abstract: 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 results are based on the generating function for the number of $k$-noncrossing RNA pseudoknot structures, ${\sf S}_k(n)$, derived in \cite{Reidys:07pseu}, where $k-1$ denotes the maximal size of sets of mutually intersecting bonds. We prove a functional equation for the generating function $\sum_{n\ge 0}{\sf S}_k(n)z^n$ and obtain for $k=2$ and $k=3$ the analytic continuation and singular expansions, respectively. It is implicit in our results that for arbitrary $k$ singular expansions exist and via transfer theorems of analytic combinatorics we obtain asymptotic expression for the coefficients. We explicitly derive the asymptotic expressions for 2- and 3-noncrossing RNA structures. Our main result is the derivation of the formula ${\sf S}_3(n) \sim \frac{10.4724\cdot 4!}{n(n-1)...(n-4)} (\frac{5+\sqrt{21}}{2})^n$., Comment: 22 pages, 7 figures
Published: 2007

12. Neutral Networks of Sequence to Shape Maps

Author: Jin, Emma Y., Qin, Jing, and Reidys, Christian M.
Subjects: Quantitative Biology - Quantitative Methods, Mathematical Physics, Mathematics - Combinatorics, Quantitative Biology - Biomolecules
Abstract: In this paper we present a novel framework for sequence to shape maps. These combinatorial maps realize exponentially many shapes, and have preimages which contain extended connected subgraphs of diameter n (neutral networks). We prove that all basic properties of RNA folding maps also hold for combinatorial maps. Our construction is as follows: suppose we are given a graph $H$ over the $\{1 >...,n\}$ and an alphabet of nucleotides together with a symmetric relation $\mathcal{R}$, implied by base pairing rules. Then the shape of a sequence of length n is the maximal H subgraph in which all pairs of nucleotides incident to H-edges satisfy $\mathcal{R}$. Our main result is to prove the existence of at least $\sqrt{2}^{n-1}$ shapes with extended neutral networks, i.e. shapes that have a preimage with diameter $n$ and a connected component of size at least $(\frac{1+\sqrt{5}}{2})^n+(\frac{1-\sqrt{5}}{2})^n$. Furthermore, we show that there exists a certain subset of shapes which carries a natural graph structure. In this graph any two shapes are connected by a path of shapes with respective neutral networks of distance one. We finally discuss our results and provide a comparison with RNA folding maps., Comment: 24 pages,4 figures
Published: 2007

13. Combinatorics Of RNA Structures With Pseudoknots

Author: Jin, Emma Y., Qin, Jing, and Reidys, Christian M.
Subjects: Mathematics - Combinatorics, Mathematics - General Mathematics, 92E05
Abstract: 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 pseudoknot structures over circular RNA. For 3-noncrossing RNA structures and RNA secondary structures we present a novel 4-term recursion formula and a 2-term recursion, respectively. Furthermore we enumerate for arbitrary $k$ all $k$-noncrossing, restricted RNA structures i.e. $k$-noncrossing RNA structures without 2-arcs i.e. arcs of the form $(i,i+2)$, for $1\le i\le n-2$., Comment: 24 pages, 7 figures
Published: 2007