426 research outputs found
Meander, Folding and Arch Statistics
The statistics of meander and related problems are studied as particular
realizations of compact polymer chain foldings. This paper presents a general
discussion of these topics, with a particular emphasis on three points: (i) the
use of a direct recursive relation for building (semi) meanders (ii) the
equivalence with a random matrix model (iii) the exact solution of simpler
related problems, such as arch configurations or irreducible meanders.Comment: 82 pages, uuencoded, uses harvmac (l mode) and epsf, 26+7 figures
include
Meanders: A Direct Enumeration Approach
We study the statistics of semi-meanders, i.e. configurations of a set of
roads crossing a river through n bridges, and possibly winding around its
source, as a toy model for compact folding of polymers. By analyzing the
results of a direct enumeration up to n=29, we perform on the one hand a large
n extrapolation and on the other hand we reformulate the available data into a
large q expansion, where q is a weight attached to each road. We predict a
transition at q=2 between a low-q regime with irrelevant winding, and a large-q
regime with relevant winding.Comment: uses harvmac (l), epsf, 16 figs included, uuencoded, tar compresse
Quantum revival patterns from classical phase-space trajectories
A general semiclassical method in phase space based on the final value
representation of the Wigner function is considered that bypasses caustics and
the need to root-search for classical trajectories. We demonstrate its
potential by applying the method to the Kerr Hamiltonian, for which the exact
quantum evolution is punctuated by a sequence of intricate revival patterns.
The structure of such revival patterns, lying far beyond the Ehrenfest time, is
semiclassically reproduced and revealed as a consequence of constructive and
destructive interferences of classical trajectories.Comment: 7 pages, 6 figure
New alphabet-dependent morphological transition in a random RNA alignment
We study the fraction of nucleotides involved in the formation of a
cactus--like secondary structure of random heteropolymer RNA--like molecules.
In the low--temperature limit we study this fraction as a function of the
number of different nucleotide species. We show, that with changing ,
the secondary structures of random RNAs undergo a morphological transition:
for as the chain length goes to infinity,
signaling the formation of a virtually "perfect" gapless secondary structure;
while , what means that a non-perfect structure with
gaps is formed. The strict upper and lower bounds are
proven, and the numerical evidence for is presented. The relevance
of the transition from the evolutional point of view is discussed.Comment: 4 pages, 3 figures (title is changed, text is essentially reworked),
accepted in PR
Meanders: Exact Asymptotics
We conjecture that meanders are governed by the gravitational version of a
c=-4 two-dimensional conformal field theory, allowing for exact predictions for
the meander configuration exponent \alpha=\sqrt{29}(\sqrt{29}+\sqrt{5})/12, and
the semi-meander exponent {\bar\alpha}=1+\sqrt{11}(\sqrt{29}+\sqrt{5})/24. This
result follows from an interpretation of meanders as pairs of fully packed
loops on a random surface, described by two c=-2 free fields. The above values
agree with recent numerical estimates. We generalize these results to a score
of meandric numbers with various geometries and arbitrary loop fugacities.Comment: new version with note added in proo
Meanders and the Temperley-Lieb algebra
The statistics of meanders is studied in connection with the Temperley-Lieb
algebra. Each (multi-component) meander corresponds to a pair of reduced
elements of the algebra. The assignment of a weight per connected component
of meander translates into a bilinear form on the algebra, with a Gram matrix
encoding the fine structure of meander numbers. Here, we calculate the
associated Gram determinant as a function of , and make use of the
orthogonalization process to derive alternative expressions for meander numbers
as sums over correlated random walks.Comment: 85p, uuencoded, uses harvmac (l mode) and epsf, 88 figure
Extremal Correlators and Hurwitz Numbers in Symmetric Product Orbifolds
We study correlation functions of single-cycle chiral operators in the
symmetric product orbifold of N supersymmetric four-tori. Correlators of twist
operators are evaluated on covering surfaces, generally of different genera,
where fields are single-valued. We compute some simple four-point functions and
study how the sum over inequivalent branched covering maps splits under OPEs.
We then discuss extremal n-point correlators, i.e. correlators of n-1 chiral
and one anti-chiral operators. They obey simple recursion relations involving
numbers obtained from counting branched covering maps with particular
properties. In most cases we are able to solve explicitly the recursion
relations. Remarkably, extremal correlators turn out to be equal to Hurwitz
numbers.Comment: 36 pages, 3 figures, v2: minor improvement
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