7,027 research outputs found
Slicing, skinning, and grafting
We prove that a Bers slice is never algebraic, meaning that its Zariski
closure in the character variety has strictly larger dimension. A corollary is
that skinning maps are never constant.
The proof uses grafting and the theory of complex projective structures.Comment: 11 pages, 1 figure, to appear in American Journal of Mathematic
The Education and Training of Artisans for the Informal Sector in Tanzania
Teaching/Communication/Extension/Profession,
Management of invasive Allee species
In this study, we use a discrete, two-patch population model of an Allee species to examine different methods in managing invasions. We first analytically examine the model to show the presence of the strong Allee effect, and then we numerically explore the model to test the effectiveness of different management strategies. As expected invasion is facilitated by lower Allee thresholds, greater carrying capacities and greater proportions of dispersers. These effects are interacting, however, and moderated by population growth rate. Using the gypsy moth as an example species, we demonstrate that the effectiveness of different invasion management strategies is context-dependent, combining complementary methods may be preferable, and the preferred strategy may differ geographically. Specifically, we find methods for restricting movement to be more effective in areas of contiguous habitat and high Allee thresholds, where methods involving mating disruptions and raising Allee thresholds are more effective in areas of high habitat fragmentation
Implications from GW170817 and I-Love-Q relations for relativistic hybrid stars
Gravitational wave observations of GW170817 placed bounds on the tidal
deformabilities of compact stars allowing one to probe equations of state for
matter at supranuclear densities. Here we design new parametrizations for
hybrid hadron-quark equations of state, that give rise to low-mass twin stars,
and test them against GW170817. We find that GW170817 is consistent with the
coalescence of a binary hybrid star--neutron star. We also test and find that
the I-Love-Q relations for hybrid stars in the third family agree with those
for purely hadronic and quark stars within for both slowly and
rapidly rotating configurations, implying that these relations can be used to
perform equation-of-state independent tests of general relativity and to break
degeneracies in gravitational waveforms for hybrid stars in the third family as
well.Comment: 8 pages, 4 figures, 2 tables; matches published version, updated fig.
Covariance Risk, Mispricing, and the Cross Section of Security Returns
This paper offers a multisecurity model in which prices reflect both covariance risk and misperceptions of firms' prospects, and in which arbitrageurs trade to profit from mispricing. We derive a pricing relationship in which expected returns are linearly related to both risk and mispricing variables. The model thereby implies a multivariate relation between expected return, beta, and variables that proxy for mispricing of idiosyncratic components of value tends to be arbitraged away but systematic mispricing is not. The theory is consistent with several empirical findings regarding the cross-section of equity returns, including: the observed ability of fundamental/price ratios to forecast aggregate and cross-sectional returns, and of market value but not non-market size measures to forecast returns cross-sectionally; and the ability in some studies of fundamental/price ratios and market value to dominate traditional measures of security risk. The model also offers several untested empirical implications for the cross-section of expected returns and for the relation of volume to subsequent volatility.
Mass and power modeling of communication satellites
Analytic estimating relationships for the mass and power requirements for major satellite subsystems are described. The model for each subsystem is keyed to the performance drivers and system requirements that influence their selection and use. Guidelines are also given for choosing among alternative technologies which accounts for other significant variables such as cost, risk, schedule, operations, heritage, and life requirements. These models are intended for application to first order systems analyses, where resources do not warrant detailed development of a communications system scenario. Given this ground rule, the models are simplified to 'smoothed' representation of reality. Therefore, the user is cautioned that cost, schedule, and risk may be significantly impacted where interpolations are sufficiently different from existing hardware as to warrant development of new devices
Technique efficacy when using a student response system in the reading classroom
Although studies using student response systems (SRSs) within the English as a foreign language (EFL) classroom are relatively rare, there is increasing evidence from a range of disciplines to highlight the potential behind application of these systems for student learning. Consequently, this study contributes to filling this gap by demonstrating the efficacy of SRS-integration in the EFL reading classroom for formative assessment when supported by teacher-interaction and peer-interaction utilization techniques. Relying on a quasi-experimental design, results suggest that a Plickers SRS-integrated classroom can provide a digitally interactive learning environment and active learning opportunities, particularly when coupled with a peer-interaction technique. It also enhances Korean EFL learner engagement with content while supporting the development of reading comprehension skills. Further, findings indicate that learners are receptive to ongoing SRS utilization as an alternative to traditional methods, viewing it as useful for highlighting their knowledge gaps, focusing their attention, and stimulating their engagement
Smoothness-Penalized Deconvolution (SPeD) of a Density Estimate
This paper addresses the deconvolution problem of estimating a
square-integrable probability density from observations contaminated with
additive measurement errors having a known density. The estimator begins with a
density estimate of the contaminated observations and minimizes a
reconstruction error penalized by an integrated squared -th derivative.
Theory for deconvolution has mainly focused on kernel- or wavelet-based
techniques, but other methods including spline-based techniques and this
smoothness-penalized estimator have been found to outperform kernel methods in
simulation studies. This paper fills in some of these gaps by establishing
asymptotic guarantees for the smoothness-penalized approach. Consistency is
established in mean integrated squared error, and rates of convergence are
derived for Gaussian, Cauchy, and Laplace error densities, attaining some lower
bounds already in the literature. The assumptions are weak for most results;
the estimator can be used with a broader class of error densities than the
deconvoluting kernel. Our application example estimates the density of the mean
cytotoxicity of certain bacterial isolates under random sampling; this mean
cytotoxicity can only be measured experimentally with additive error, leading
to the deconvolution problem. We also describe a method for approximating the
solution by a cubic spline, which reduces to a quadratic program.Comment: Revisions: added new theorem in Section 6; added list of assumptions;
other, more minor revisions throughou
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