3,677 research outputs found

    Gas-dynamic shock heating of post-flare loops due to retraction following localized, impulsive reconnection

    Full text link
    We present a novel model in which shortening of a magnetic flux tube following localized, three-dimensional reconnection generates strong gas-dynamic shocks around its apex. The shortening releases magnetic energy by progressing away from the reconnection site at the Alfven speed. This launches inward flows along the field lines whose collision creates a pair of gas-dynamic shocks. The shocks raise both the mass density and temperature inside the newly shortened flux tube. Reconnecting field lines whose initial directions differ by more that 100 degrees can produce a concentrated knot of plasma hotter that 20 MK, consistent with observations. In spite of these high temperatures, the shocks convert less than 10% of the liberated magnetic energy into heat - the rest remains as kinetic energy of bulk motion. These gas-dynamic shocks arise only when the reconnection is impulsive and localized in all three dimensions; they are distinct from the slow magnetosonic shocks of the Petschek steady-state reconnection model

    Passive Optical Sample Assembly (POSA) for STS-1 quick look post-mission report

    Get PDF
    A passively deployed array of contamination-sensitive samples was mounted and flown in the cargo bay of the space shuttle Columbia during the first orbital flight test. A similar unit was mounted in a different location in the cargo bay at Dryden Flight Research Center during the postflight operations there prior to the ferry flight return of Columbia to Kennedy Space Center. The samples in both POSA arrays were subjected to a series of optical and analytical measurements prior to delivery for installation in the cargo bay and after retrieval of the flight hardware. A quick-look summary of the results of a comparison of the series of measurements is presented

    Identifying long cycles in finite alternating and symmetric groups acting on subsets

    Get PDF
    Let HH be a permutation group on a set Λ\Lambda, which is permutationally isomorphic to a finite alternating or symmetric group AnA_n or SnS_n acting on the kk-element subsets of points from {1,,n}\{1,\ldots,n\}, for some arbitrary but fixed kk. Suppose moreover that no isomorphism with this action is known. We show that key elements of HH needed to construct such an isomorphism φ\varphi, such as those whose image under φ\varphi is an nn-cycle or (n1)(n-1)-cycle, can be recognised with high probability by the lengths of just four of their cycles in Λ\Lambda.Comment: 45 page

    The Existence and Asymptotic Properties of a Backfitting Projection Algorithm Under Weak Conditions

    Get PDF
    We derive the asymptotic distribution of a new backfitting procedure for estimating the closest additive approximation to a nonparametric regression function. The procedure employs a recent projection interpretation of popular kernel estimators provided by Mammen et al. (1997), and the asymptotic theory of our estimators is derived using the theory of additive projections reviewed in Bickel et al. (1995). Our procedure achieves the same bias and variance as the oracle estimator based on knowing the other components, and in this sense improves on the method analyzed in Opsomer and Ruppert (1997). We provide 'high level' conditions independent of the sampling scheme. We then verify that these conditions are satisfied in a time series autoregression under weak conditions.Additive models, alternating projections, backfitting, kernel smoothing, local polynomials, nonparametric regression

    The existence and asymptotic properties of a backfitting projection algorithm under weak conditions.

    Get PDF
    We derive the asymptotic distribution of a new backfitting procedure for estimating the closest additive approximation to a nonparametric regression function. The procedure employs a recent projection interpretation of popular kernel estimators provided by Mammen, Marron, Turlach and Wand and the asymptotic theory of our estimators is derived using the theory of additive projections reviewed in Bickel, Klaassen, Ritov and Wellner. Our procedure achieves the same bias and variance as the oracle estimator based on knowing the other components, and in this sense improves on the method analyzed in Opsomer and Ruppert. We provide ‘‘high level’’ conditions independent of the sampling scheme. We then verify that these conditions are satisfied in a regression and a time series autoregression under weak conditions.

    On Flux Rope Stability and Atmospheric Stratification in Models of Coronal Mass Ejections Triggered by Flux Emergence

    Full text link
    Flux emergence is widely recognized to play an important role in the initiation of coronal mass ejections. The Chen-Shibata (2000) model, which addresses the connection between emerging flux and flux rope eruptions, can be implemented numerically to study how emerging flux through the photosphere can impact the eruption of a pre-existing coronal flux rope. The model's sensitivity to the initial conditions and reconnection micro-physics is investigated with a parameter study. In particular, we aim to understand the stability of the coronal flux rope in the context of X-point collapse and the effects of boundary driving in both unstratified and stratified atmospheres. In the absence of driving, we assess the behavior of waves in the vicinity of the X-point. With boundary driving applied, we study the effects of reconnection micro-physics and atmospheric stratification on the eruption. We find that the Chen-Shibata equilibrium can be unstable to an X-point collapse even in the absence of driving due to wave accumulation at the X-point. However, the equilibrium can be stabilized by reducing the compressibility of the plasma, which allows small-amplitude waves to pass through the X-point without accumulation. Simulations with the photospheric boundary driving evaluate the impact of reconnection micro-physics and atmospheric stratification on the resulting dynamics: we show the evolution of the system to be determined primarily by the structure of the global magnetic fields with little sensitivity to the micro-physics of magnetic reconnection; and in a stratified atmosphere, we identify a novel mechanism for producing quasi-periodic behavior at the reconnection site behind a rising flux rope as a possible explanation of similar phenomena observed in solar and stellar flares.Comment: Submitted Feb 28, 2014 to, accepted Aug 14, 2014 by Astronomy & Astrophysics. 13 pages, 10 figures, 2 table

    Isolation of salt-tolerant, iron-oxidising, acidophilic bacteria and assessment of their bioleaching potential at high salinity

    Get PDF
    The occurrence of chemoautotrophic, acidophilic bacteria in the marine environment has been widely noted and they have been implicated in the biogeochemical cycling of iron and biodeterioration of iron-containing structures in the oceans. However, the isolation, molecular ecology, growth profiles and physiological responses of these bacteria at elevated salt levels have rarely been described, despite widespread interest in their unique metabolic capacity. These bacteria may have a potential application in the extraction of metals via bioleaching of salt contaminated ores or to facilitate the use of seawater in the bioleaching process. Traditional bioleaching microorganisms cannot be used in these cases due to the toxicity of elevated salt concentrations. In this study, three strains of halotolerant gram-positive, rod shaped, acidophilic bacteria were isolated from estuarine and coastal areas, two of which were novel species. Enrichment cultures were set up using pyrite medium of different salinities with sediment and seawater samples from a variety of metal contaminated areas exposed to the sea or brackish water. These enrichment cultures were then further purified using end-point dilution culture methods and the 16S rRNA genes were sequenced and phylogeny assessed. The growth characteristics, morphology and growth profiles on a variety of metaliferrous ore samples of the strains were characterised. The strains exhibited autotrophic growth on a variety of iron and sulphur-containing compounds, heterotrophic growth on yeast extract medium as well as mixotrophic growth on a combination of these substrates. The strains grew optimally with 30gl" sea salts added to the medium, at a pH of 2.0 and a temperature of 37"C. Two of these isolated bacteria represent novel species in the genera Suffibbacillus and Alicyclobacillus. High final iron dissolution levels were demonstrated after biooxidation of Lihir gold ore and Escondida Copper ore in medium with 30 gl" sea salts and 2% ore for 30 days. Bacterium 4G mediated 66.10%, 5C 100% and Cligga 88.86% dissolution of the total iron present in the Lihir sample after 30 days, while bacterium 4G mediated 52.63%, 5C 60% and Cligga 49.75% dissolution of the total iron present in the Escondida samples after 30 days. The growth characteristics displayed by these bacterial strains demonstrate their potential application in high salinity bioleaching operation

    Estimating Yield Curves by Kernel Smoothing Methods

    Get PDF
    We introduce a new method for the estimation of discount functions, yield curves and forward curves for coupon bonds. Our approach is nonparametric and does not assume a particular functional form for the discount function although we do show how to impose various important restrictions in the estimation. Our method is based on kernel smoothing and is defined as the minimum of some localized population moment condition. The solution to the sample problem is not explicit and our estimation procedure is iterative, rather like the backfitting method of estimating additive nonparametric models. We establish the asymptotic normality of our methods using the asymptotic representation of our estimator as an infinite series with declining coefficients. The rate of convergence is standard for one dimensional nonparametric regression.Coupon bonds; forward curve; Hilbert space; local linear; nonparametric regression; yield curve
    corecore