9,466 research outputs found
A lower bound for linear approximate compaction
The {\em -approximate compaction} problem is: given an input array of values, each either 0 or 1, place each value in an output array so that all the 1's are in the first array locations, where is the number of 1's in the input. is an accuracy parameter. This problem is of fundamental importance in parallel computation because of its applications to processor allocation and approximate counting. When is a constant, the problem is called {\em Linear Approximate Compaction} (LAC). On the CRCW PRAM model, %there is an algorithm that solves approximate compaction in \order{(\log\log n)^3} time for , using processors. Our main result shows that this is close to the best possible. Specifically, we prove that LAC requires % time using \order{n} processors. We also give a tradeoff between and the processing time. For , and , the time required is
A semiclassical theory of quantum noise in open chaotic systems
We consider the quantum evolution of classically chaotic systems in contact
with surroundings. Based on -scaling of an equation for time evolution
of the Wigner's quasi-probability distribution function in presence of
dissipation and thermal diffusion we derive a semiclassical equation for
quantum fluctuations. This identifies an early regime of evolution dominated by
fluctuations in the curvature of the potential due to classical chaos and
dissipation. A stochastic treatment of this classical fluctuations leads us to
a Fokker-Planck equation which is reminiscent of Kramers' equation for
thermally activated processes. This reveals an interplay of three aspects of
evolution of quantum noise in weakly dissipative open systems; the reversible
Liouville flow, the irreversible chaotic diffusion which is characteristic of
the system itself, and irreversible dissipation induced by the external
reservoir. It has been demonstrated that in the dissipation-free case a
competition between Liouville flow in the contracting direction of phase space
and chaotic diffusion sets a critical width in the Wigner function for quantum
fluctuations. We also show how the initial quantum noise gets amplified by
classical chaos and ultimately equilibrated under the influence of dissipation.
We establish that there exists a critical limit to the expansion of phase
space. The limit is determined by chaotic diffusion and dissipation. Making use
of appropriate quantum-classical correspondence we verify the semiclassical
analysis by the fully quantum simulation in a chaotic quartic oscillator.Comment: Plain Latex, 27 pages, 6 ps figure, To appear in Physica
A Note on Effective String Theory
Motivated by the possibility of an effective string description for the
infrared limit of pure Yang-Mills theory, we present a toy model for an
effective theory of random surfaces propagating in a target space of . We
show that the scaling exponents for the fixed area partition function of the
theory are apparently well behaved. We make some observations regarding the
usefulness of this toy model.Comment: 17 pages, LATEX, UTTG-21-9
A model for projectile fragmentation
A model for projectile fragmentation is developed whose origin can be traced
back to the Bevalac era. The model positions itself between the
phenomenological EPAX parametrization and transport models like "Heavy Ion
Phase Space Exploration" (HIPSE) model and antisymmetrised molecular dynamics
(AMD) model. A very simple impact parameter dependence of input temperature is
incorporated in the model which helps to analyze the more peripheral
collisions. The model is applied to calculate the charge, isotopic
distributions, average number of intermediate mass fragments and the average
size of largest cluster at different Z_{bound} of different projectile
fragmentation reactions at different energies.Comment: Talk given by Gargi Chaudhuri at the 11th International Conference on
Nucleus-Nucleus Collisions (NN2012), San Antonio, Texas, USA, May 27-June 1,
2012. 10 pages, 7 figure
Studies of structural, magnetic, electrical and photoconducting properties of BiCaMnO epitaxial thin films
The dynamics of the charge ordered (CO) state under non-equilibrium
conditions created by strong dc-electric field (~106 V/cm) and
photo-illumination with short (~ 6 ns) laser pulses is investigated in
Bi1-xCaxMnO3 (x > 0.5) epitaxial films. A pulsed laser deposition method was
used to synthesize films on (100) LaAlO3 (LAO) and (100) SrTiO3 (STO)
substrates. The crystallographic structure, temperature dependence of
electrical resistivity and magnetization of the samples of different
composition prepared under different oxygen partial pressure (pO2) and
deposition temperature (TD) are studied. For the x = 0.6 sample grown on LAO, a
clear signature of charge ordering at ~275 K is seen in the magnetization and
at ~ 260 K in the resistivity data. The same sample grown on STO revealed a
complex behavior, which entails charge ordering at ~300 K, a Neel order at ~150
K and finally a weak ferromagnetic phase below 50 K. A strong correlation
between charge ordering temperature (TCO) and the c-axis lattice parameter (c)
of the type (dTCO/dc ~-350 K/A) imerges from measurements on films deposited
under different growth conditions. Since the out of plane lattice parameter (c)
increases with in plane compressive strain, this effect directly show a
compressive strain induced suppression of the TCO. The current (I)- voltage (V)
characteristics of the samples at T < TCO show hysteresis due to a compound
effect of Joule heating and collapse of the CO state. Transient changes in
conductivity of lifetime ranging from nano to microseconds are seen at T < TCO
on illumination with pulsed UV (355 nm) radiation. These observations are
explained on the basis of the topological and electronic changes in the charge
ordered phase.Comment: 19 figures, 34 page
A Conditional Empirical Likelihood Based Method for Model Parameter Estimation from Complex survey Datasets
We consider an empirical likelihood framework for inference for a statistical
model based on an informative sampling design. Covariate information is
incorporated both through the weights and the estimating equations. The
estimator is based on conditional weights. We show that under usual conditions,
with population size increasing unbounded, the estimates are strongly
consistent, asymptotically unbiased and normally distributed. Our framework
provides additional justification for inverse probability weighted score
estimators in terms of conditional empirical likelihood. In doing so, it
bridges the gap between design-based and model-based modes of inference in
survey sampling settings. We illustrate these ideas with an application to an
electoral survey
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