704 research outputs found
Quantitative spectral perturbation theory for compact operators on a Hilbert space
We introduce compactness classes of Hilbert space operators by grouping
together all operators for which the associated singular values decay at a
certain speed and establish upper bounds for the norm of the resolvent of
operators belonging to a particular compactness class. As a consequence we
obtain explicitly computable upper bounds for the Hausdorff distance of the
spectra of two operators belonging to the same compactness class in terms of
the distance of the two operators in operator norm.Comment: 26 page
The Role of Institutions, Culture, and Wellbeing in Explaining Bilateral Remittance Flows: Evidence Both Cross-Country and Individual-Level Analysis
This paper explores the determinants of bilateral remittance flows at the country-level; specifically, institutional quality, wellbeing, and culture using a novel dataset published by Ratha and Shaw (2007). Next, we look for support in the German Socio-Economic Panel using individual level regressions which allows us: (i) to control for various individual correlates and fixed effects, and (ii) to analyze remittances sent for different purposes separately. We uncover important relationships with these unique datasets. The country-level results indicate; (i) classical gravity equation variables explain bilateral remittance flows (ii) institutional quality, wellbeing and cultural differences play important role in explaining bilateral remittance flows (iii) financial variables such as exchange rate and interest rate differentials matter as well. Institutional quality matters more for remittance flows between high-income countries and between low-income countries but it does not explain the remittance flows from high-income to low-income countries. Cultural differences become a more dominant factor in explaining the flows between low-income countries. These findings are also supported by the individual level analysis. In addition, German migrants send less money back home when they feel like more German and become home-owners. Countries receive less remittances from Germany when they become happier, their health-care and social-security system improve but receive more with confidence in government, chance of war, and improved political system. These institutional factors only matter for remittances sent for family support. Financial variables such interest rate and exchange rate differentials however, only matter for remittances sent for savings purposes. The results have important policy implications. Institutions matter for remittances but treating whole institutions as one in this framework can be misleading. The role of financial variables, indicators of institutions, and culture depend on the form of remittance and the characteristics of receiving and sending countries.Bilateral cross-country remittance data, individual-level remittance data, institutional quality, wellbeing, gravity equations.
Bounds on 2m/R for static spherical objects
It is well known that a spherically symmetric constant density static star, modeled as a perfect fluid, possesses a bound on its mass m by its radial size R given by 2m/R \le 8/9 and that this bound continues to hold when the energy density decreases monotonically. The existence of such a bound is intriguing because it occurs well before the appearance of an apparent horizon at m = R/2. However, the assumptions made are extremely restrictive. They do not hold in a humble soap bubble and they certainly do not approximate any known topologically stable field configuration. We show that the 8/9 bound is robust by relaxing these assumptions. If the density is monotonically decreasing and the tangential stress is less than or equal to the radial stress we show that the 8/9 bound continues to hold through the entire bulk if m is replaced by the quasi-local mass. If the tangential stress exceeds the radial stress and/or the density is not monotonic we cannot recover the 8/9 bound. However, we can show that 2m/R remains strictly bounded away from unity by constructing an explicit upper bound which depends only on the ratio of the stresses and the variation of the density
Flat foliations of spherically symmetric geometries
We examine the solution of the constraints in spherically symmetric general relativity when spacetime has a flat spatial hypersurface. We demonstrate explicitly that given one flat slice, a foliation by flat slices can be consistently evolved. We show that when the sources are finite these slices do not admit singularities and we provide an explicit bound on the maximum value assumed by the extrinsic curvature. If the dominant energy condition is satisfied, the projection of the extrinsic curvature orthogonal to the radial direction possesses a definite sign. We provide both necessary and sufficient conditions for the formation of apparent horizons in this gauge which are qualitatively identical to those established earlier for extrinsic time foliations of spacetime, Phys. Rev. D56 7658, 7666 (1997) which suggests that these conditions possess a gauge invariant validity
Algorithms for efficient vectorization of repeated sparse power system network computations
Cataloged from PDF version of article.Standard sparsity-based algorithms used in power system
appllcations need to be restructured for efficient vectorization
due to the extremely short vectors processed. Further, intrinsic
architectural features of vector computers such as chaining and
sectioning should also be exploited for utmost performance. This
paper presents novel data storage schemes and vectorization alsorim
that resolve the recurrence problem, exploit chaining and
minimize the number of indirect element selections in the repeated
solution of sparse linear system of equations widely encountered
in various power system problems. The proposed schemes are
also applied and experimented for the vectorization of power mismatch
calculations arising in the solution phase of FDLF which involves
typical repeated sparse power network computations. The
relative performances of the proposed and existing vectorization
schemes are evaluated, both theoretically and experimentally on
IBM 3090ArF.Standard sparsity-based algorithms used in power system appllcations need to be restructured for efficient vectorization
due to the extremely short vectors processed. Further, intrinsic architectural features of vector computers such as chaining and sectioning should also be exploited for utmost performance. This paper presents novel data storage schemes and vectorization alsorim that resolve the recurrence problem, exploit chaining and minimize the number of indirect element selections in the repeated solution of sparse linear system of equations widely encountered in various power system problems. The proposed schemes are also applied and experimented for the vectorization of power mismatch calculations arising in the solution phase of FDLF which involves typical repeated sparse power network computations. The relative performances of the proposed and existing vectorization schemes are evaluated, both theoretically and experimentally on IBM 3090ArF
Computationally-efficient realtime interpolation algorithm for non-uniform sampled biosignals
This Letter presents a novel, computationally efficient interpolation method that has been optimised for use in electrocardiogram baseline drift removal. In the authors previous Letter three isoelectric baseline points per heartbeat are detected, and here utilised as interpolation points. As an extension from linear interpolation, their algorithm segments the interpolation interval and utilises different piecewise linear equations. Thus, the algorithm produces a linear curvature that is computationally efficient while interpolating non-uniform samples. The proposed algorithm is tested using sinusoids with different fundamental frequencies from 0.05 to 0.7 Hz and also validated with real baseline wander data acquired from the Massachusetts Institute of Technology University and Bostons Beth Israel Hospital (MIT-BIH) Noise Stress Database. The synthetic data results show an root mean square (RMS) error of 0.9 μV (mean), 0.63 μV (median) and 0.6 μV (standard deviation) per heartbeat on a 1 mVp-p 0.1 Hz sinusoid. On real data, they obtain an RMS error of 10.9 μV (mean), 8.5 μV (median) and 9.0 μV (standard deviation) per heartbeat. Cubic spline interpolation and linear interpolation on the other hand shows 10.7 μV, 11.6 μV (mean), 7.8 μV, 8.9 μV (median) and 9.8 μV, 9.3 μV (standard deviation) per heartbeat
The Constraints in Spherically Symmetric General Relativity II --- Identifying the Configuration Space: A Moment of Time Symmetry
We continue our investigation of the configuration space of general
relativity begun in I (gr-qc/9411009). Here we examine the Hamiltonian
constraint when the spatial geometry is momentarily static (MS). We show that
MS configurations satisfy both the positive quasi-local mass (QLM) theorem and
its converse. We derive an analytical expression for the spatial metric in the
neighborhood of a generic singularity. The corresponding curvature singularity
shows up in the traceless component of the Ricci tensor. We show that if the
energy density of matter is monotonically decreasing, the geometry cannot be
singular. A supermetric on the configuration space which distinguishes between
singular geometries and non-singular ones is constructed explicitly. Global
necessary and sufficient criteria for the formation of trapped surfaces and
singularities are framed in terms of inequalities which relate appropriate
measures of the material energy content on a given support to a measure of its
volume. The strength of these inequalities is gauged by exploiting the exactly
solvable piece-wise constant density star as a template.Comment: 50 pages, Plain Tex, 1 figure available from the authors
Helfrich-Canham bending energy as a constrained non-linear sigma model
The Helfrich-Canham bending energy is identified with a non-linear sigma
model for a unit vector. The identification, however, is dependent on one
additional constraint: that the unit vector be constrained to lie orthogonal to
the surface. The presence of this constraint adds a source to the divergence of
the stress tensor for this vector so that it is not conserved. The stress
tensor which is conserved is identified and its conservation shown to reproduce
the correct shape equation.Comment: 5 page
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