496 research outputs found
Analytical results regarding electrostatic resonances of surface phonon/plasmon polaritons: separation of variables with a twist
The boundary integral equation method ascertains explicit relations between
localized surface phonon and plasmon polariton resonances and the eigenvalues
of its associated electrostatic operator. We show that group-theoretical
analysis of Laplace equation can be used to calculate the full set of
eigenvalues and eigenfunctions of the electrostatic operator for shapes and
shells described by separable coordinate systems. These results not only unify
and generalize many existing studies but also offer the opportunity to expand
the study of phenomena like cloaking by anomalous localized resonance. For that
reason we calculate the eigenvalues and eigenfunctions of elliptic and circular
cylinders. We illustrate the benefits of using the boundary integral equation
method to interpret recent experiments involving localized surface phonon
polariton resonances and the size scaling of plasmon resonances in graphene
nano-disks. Finally, symmetry-based operator analysis can be extended from
electrostatic to full-wave regime. Thus, bound states of light in the continuum
can be studied for shapes beyond spherical configurations.Comment: 25 pages, 3 figures, to be published Proc. Royal Soc.
Lower bound on the number of Toffoli gates in a classical reversible circuit through quantum information concepts
The question of finding a lower bound on the number of Toffoli gates in a
classical reversible circuit is addressed. A method based on quantum
information concepts is proposed. The method involves solely concepts from
quantum information - there is no need for an actual physical quantum computer.
The method is illustrated on the example of classical Shannon data compression.Comment: 4 pages, 2 figures; revised versio
Parallel Load Balancing Strategies for Ensembles of Stochastic Biochemical Simulations
The evolution of biochemical systems where some chemical species are present with only a small number of molecules, is strongly influenced by discrete and stochastic effects that cannot be accurately captured by continuous and deterministic models. The budding yeast cell cycle provides an excellent example of the need to account for stochastic effects in biochemical reactions. To obtain statistics of the cell cycle progression, a stochastic simulation algorithm must be run thousands of times with different initial conditions and parameter values. In order to manage the computational expense involved, the large ensemble of runs needs to be executed in parallel. The CPU time for each individual task is unknown before execution, so a simple strategy of assigning an equal number of tasks per processor can lead to considerable work imbalances and loss of parallel efficiency. Moreover, deterministic analysis approaches are ill suited for assessing the effectiveness of load balancing algorithms in this context. Biological models often require stochastic simulation. Since generating an ensemble of simulation results is computationally intensive, it is important to make efficient use of computer resources. This paper presents a new probabilistic framework to analyze the performance of dynamic load balancing algorithms when applied to large ensembles of stochastic biochemical simulations. Two particular load balancing strategies (point-to-point and all-redistribution) are discussed in detail. Simulation results with a stochastic budding yeast cell cycle model confirm the theoretical analysis. While this work is motivated by cell cycle modeling, the proposed analysis framework is general and can be directly applied to any ensemble simulation of biological systems where many tasks are mapped onto each processor, and where the individual compute times vary considerably among tasks
A Framework to Analyze the Performance of Load Balancing Schemes for Ensembles of Stochastic Simulations
Ensembles of simulations are employed to estimate the statistics of possible future states of a system, and are widely used in important applications such as climate change and biological modeling. Ensembles of runs can naturally be executed in parallel. However, when the CPU times of individual simulations vary considerably, a simple strategy of assigning an equal number of tasks per processor can lead to serious work imbalances and low parallel efficiency. This paper presents a new probabilistic framework to analyze the performance of dynamic load balancing algorithms for ensembles of simulations where many tasks are mapped onto each processor, and where the individual compute times vary considerably among tasks. Four load balancing strategies are discussed: most-dividing, all-redistribution, random-polling, and neighbor-redistribution. Simulation results with a stochastic budding yeast cell cycle model is consistent with the theoretical analysis. It is especially significant that there is a provable global decrease in load imbalance for the local rebalancing algorithms due to scalability concerns for the global rebalancing algorithms. The overall simulation time is reduced by up to 25%, and the total processor idle time by 85%
Optical matrix elements in tight-binding models with overlap
We investigate the effect of orbital overlap on optical matrix elements in
empirical tight-binding models. Empirical tight-binding models assume an
orthogonal basis of (atomiclike) states and a diagonal coordinate operator
which neglects the intra-atomic part. It is shown that, starting with an atomic
basis which is not orthogonal, the orthogonalization process induces
intra-atomic matrix elements of the coordinate operator and extends the range
of the effective Hamiltonian. We analyze simple tight-binding models and show
that non-orthogonality plays an important role in optical matrix elements. In
addition, the procedure gives formal justification to the nearest-neighbor
spin-orbit interaction introduced by Boykin [Phys. Rev \textbf{B} 57, 1620
(1998)] in order to describe the Dresselahaus term which is neglected in
empirical tight-binding models.Comment: 16 pages 6 figures, to appear in Phys. Rev.
Violations of local realism by two entangled quNits
Results obtained in two recent papers, \cite{Kaszlikowski} and \cite{Durt},
seem to indicate that the nonlocal character of the correlations between the
outcomes of measurements performed on entangled systems separated in space is
not robust in the presence of noise. This is surprising, since entanglement
itself is robust. Here we revisit this problem and argue that the class of
gedanken-experiments considered in \cite{Kaszlikowski} and \cite{Durt} is too
restrictive. By considering a more general class, involving sequences of
measurements, we prove that the nonlocal correlations are in fact robust.Comment: Reference added, 3 pages, accepted for publication in J. Phys. A:
Math. and Genera
High Temperature Mixed State Axis Dissipation in Low Carrier Density
The nature of the out-of-plane dissipation was investigated in underdoped
single crystals at temperatures
close to the critical temperature. For this goal, temperature and angle
dependent out-of-plane resistivity measurements were carried out both below and
above the critical temperature. We found that the Ambegaokar-Halperin
relationship [V. Ambegaokar, and B. I. Halperin, Phys. Rev. Lett. \textbf{22},
1364 (1969)] depicts very well the angular magnetoresistivity in the
investigated range of field and temperature. The main finding is that the
in-plane phase fluctuations decouple the layers above the critical temperature
and the charge transport is governed only by the quasiparticles. We also have
calculated the interlayer Josephson critical current density, which was found
to be much smaller than the one predicted by the theory of layered
superconductors. This discrepancy could be a result of the d-wave symmetry of
the order parameter and/or of the non BCS temperature dependence of the c-axis
penetration length.Comment: Will appear in PR
Structural brain complexity and cognitive decline in late life : A longitudinal study in the Aberdeen 1936 Birth Cohort
Copyright © 2014 Elsevier Inc. All rights reserved.Peer reviewedPostprin
Parametric FEM simulation of composite barrier FTJs under external bias at room temperature
A study on a parametrized model of a composite barrier FTJ (three-interface
system, with a non-polar dielectric layer) under an external bias voltage and
at room temperature, using FEM-based simulations, was performed. The approach
involves the Thomas-Fermi model assuming incomplete screening of polarization
charges for building the energy barrier profile, and numerically simulates the
electron transport through the barrier by bias-voltage-dependent tunneling,
using Tsu-Esaki formulation. That naturally include the temperature dependent
contributions to the total current density. The TER coefficient and current
densities are computed considering variation of a large set of parameters that
describe the composite barrier FTJ system in realistic physical range of values
with respect to a reference (prototypical) system. In this study, the
parametric simulations were performed starting from selected data reported on
the SRO/STO/BTO/SRO heterostructure. The most important results of our work can
be stated as follows: i) The FEM simulations prove to be reliable approach when
we are interested in the prediction of FTJ characteristics at temperatures
close to 300 K, and ii) We show that several configurations with large TER
values may be predicted, but at the expense of very low current densities in
the ON state. We suggest that the results may be useful for assessing the FTJ
performances at ambient temperature, as well as to design preoptimized FTJs by
using different combinations of materials to comply with a set of properties of
a specific model
- …