14,061 research outputs found
Change point estimation for the telegraph process observed at discrete times
The telegraph process models a random motion with finite velocity and it is
usually proposed as an alternative to diffusion models. The process describes
the position of a particle moving on the real line, alternatively with constant
velocity or . The changes of direction are governed by an homogeneous
Poisson process with rate In this paper, we consider a change
point estimation problem for the rate of the underlying Poisson process by
means of least squares method. The consistency and the rate of convergence for
the change point estimator are obtained and its asymptotic distribution is
derived. Applications to real data are also presented
Empirical -distance test statistics for ergodic diffusions
The aim of this paper is to introduce a new type of test statistic for simple
null hypothesis on one-dimensional ergodic diffusion processes sampled at
discrete times. We deal with a quasi-likelihood approach for stochastic
differential equations (i.e. local gaussian approximation of the transition
functions) and define a test statistic by means of the empirical -distance
between quasi-likelihoods. We prove that the introduced test statistic is
asymptotically distribution free; namely it weakly converges to a
random variable. Furthermore, we study the power under local alternatives of
the parametric test. We show by the Monte Carlo analysis that, in the small
sample case, the introduced test seems to perform better than other tests
proposed in literature
Shedding Light on Diatom Photonics by means of Digital Holography
Diatoms are among the dominant phytoplankters in the worl's ocean, and their
external silica investments, resembling artificial photonics crystal, are
expected to play an active role in light manipulation. Digital holography
allowed studying the interaction with light of Coscinodiscus wailesii cell wall
reconstructing the light confinement inside the cell cytoplasm, condition that
is hardly accessible via standard microscopy. The full characterization of the
propagated beam, in terms of quantitative phase and intensity, removed a
long-standing ambiguity about the origin of the light. The data were discussed
in the light of living cell behavior in response to their environment
Van der Waals Coefficients of Atoms and Molecules from a Simple Approximation for the Polarizability
A simple and computationally efficient scheme to calculate approximate
imaginary-frequency dependent polarizability, hence asymptotic van der Waals
coefficient, within density functional theory is proposed. The dynamical
dipolar polarizabilities of atoms and molecules are calculated starting from
the Thomas-Fermi-von Weizs\"acker (TFvW) approximation for the
independent-electron kinetic energy functional. The van der Waals coefficients
for a number of closed-shell ions and a few molecules are hence calculated and
compared with available values obtained by fully first-principles calculations.
The success in these test cases shows the potential of the proposed TFvW
approximate response function in capturing the essence of long range
correlations and may give useful information for constructing a functional
which naturally includes van der Waals interactions.Comment: 6 pages, 4 figures. To appear in Phys. Rev.
An Observational Cohort Study on Delayed-Onset Infections after Mandibular Third-Molar Extractions.
OBJECTIVES:
The purpose of the present study was to investigate the occurrence and clinical features of delayed-onset infections after mandibular third-molar extractions.
METHOD AND MATERIALS:
An observational cohort study was conducted on 179 patients undergoing mandibular third-molar extraction between January 2013 and December 2015, for a total of 217 extractions. Data were recorded at the time of extraction (T0), on suture removal seven days later (T1), and 30 days after the extraction, when patients were contacted and asked about their healing process (T2). The statistical analysis was performed with nonparametric tests. A p value lower than 0.05 was considered statistically significant.
RESULTS:
Eight delayed-onset infections were recorded, amounting to 3.7% of all extractions. The median time elapsing from the extraction to the delayed-onset infection was 35 days (IQR 28-40; min 24-max 49). Younger age and longer surgical procedures seemed to be more often associated with this complication.
CONCLUSION:
Delayed-onset infections after third-molar extractions are relatively rare postoperative complications characterized by a swelling, usually with a purulent discharge. Patients should be informed of this possibility, which might develop even several weeks after the extraction
TE Wave Measurement and Modeling
In the TE wave method, microwaves are coupled into the beam-pipe and the
effect of the electron cloud on these microwaves is measured. An electron cloud
(EC) density can then be calculated from this measurement. There are two
analysis methods currently in use. The first treats the microwaves as being
transmitted from one point to another in the accelerator. The second more
recent method, treats the beam-pipe as a resonant cavity. This paper will
summarize the reasons for adopting the resonant TE wave analysis as well as
give examples from CESRTA and DA{\Phi}NE of resonant beam-pipe. The results of
bead-pull bench measurements will show some possible standing wave patterns,
including a cutoff mode (evanescent) where the field decreases exponentially
with distance from the drive point. We will outline other recent developments
in the TE wave method including VORPAL simulations of microwave resonances, as
well as the simulation of transmission in the presence of both an electron
cloud and magnetic fields.Comment: Presented at ECLOUD'12: Joint INFN-CERN-EuCARD-AccNet Workshop on
Electron-Cloud Effects, La Biodola, Isola d'Elba, Italy, 5-9 June 2012;
CERN-2013-002, pp. 193-20
Self-organisation to criticality in a system without conservation law
We numerically investigate the approach to the stationary state in the
nonconservative Olami-Feder-Christensen (OFC) model for earthquakes. Starting
from initially random configurations, we monitor the average earthquake size in
different portions of the system as a function of time (the time is defined as
the input energy per site in the system). We find that the process of
self-organisation develops from the boundaries of the system and it is
controlled by a dynamical critical exponent z~1.3 that appears to be universal
over a range of dissipation levels of the local dynamics. We show moreover that
the transient time of the system scales with system size L as . We argue that the (non-trivial) scaling of the transient time in the
OFC model is associated to the establishment of long-range spatial correlations
in the steady state.Comment: 10 pages, 6 figures; accepted for publication in Journal of Physics
Wave and Particle Limit for Multiple Barrier Tunneling
The particle approach to one-dimensional potential scattering is applied to
non relativistic tunnelling between two, three and four identical barriers. We
demonstrate as expected that the infinite sum of particle contributions yield
the plane wave results. In particular, the existence of resonance/transparency
for twin tunnelling in the wave limit is immediately obvious. The known
resonances for three and four barriers are also derived. The transition from
the wave limit to the particle limit is exhibit numerically.Comment: 15 pages, 3 figure
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