Search results for "diffusion"

showing 10 items of 1615 documents

Simulation of the dynamics of hard ellipsoids

2008

We study a system of uniaxial hard ellipsoids by molecular dynamics simulations, changing both the aspect-ratio X-0 (X-0 = a/b, where a is the length of the revolution axis and b is the length of the two other axes) and the packing fraction phi. We calculate the translational and rotational mean squared displacements, the translational D-trans and the rotational D-rot diffusion coefficients and the associated isodiffusivity lines in the phi - X-0 plane. For the first time, we characterize the cage effect through the logarithmic time derivative of log and log . These quantities exhibit a minimum if the system is supercooled and we show that, consistently with our previous findings, for large…

GLASS-FORMING LIQUIDSCondensed matter physicscomputer simulation; event-driven molecular dynamics; glass transition; glass-forming liquids; hard ellipsoids; hard-ellipsoids; mode coupling theory; mode-coupling theory; nematic orderPlane (geometry)ScatteringChemistryRELAXATIONCondensed Matter PhysicsAtomic packing factorMolecular dynamicsClassical mechanicsTime derivativeRelaxation (physics)Cage effectDiffusion (business)TRANSITIONPhilosophical Magazine
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Studies on Holothuriapolii (echinodermata) coelomocyte lysate II. Isolation of coelomocyte hemolysins

1988

The lytic activity of the Holothuria polii coelomocyte lysate resides in two electrophoretically distinct hemolysins identified as He1 and He2. He1 represents the calcium dependent, heat-labile component whereas He2 is calcium independent and heat-stable. The two hemolysins share serological identity. Both hemolysins appear as single protein molecules of 80KDa molecular weight by SDS-PAGE and transblotting analysis under non-reducing conditions. However under reducing conditions, they are doublets of 76 and 80KDa molecular weight. The hypothesis that the two hemolysins could be isoforms is discussed.

Gel electrophoresisImmunodiffusionbiologySea CucumbersImmunologyHemolysinbiology.organism_classificationHemolysin ProteinsMicrobiologyMolecular WeightHemolysin ProteinsCytolysisRed blood cellmedicine.anatomical_structureLytic cyclemedicineAnimalsElectrophoresis Polyacrylamide GelHolothuriaCoelomocyteEchinodermataDevelopmental BiologyDevelopmental & Comparative Immunology
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Numerical evidence for a thermal driving force during adsorption of butane in silicalite.

2009

International audience; The transport properties of nano-porous materials determine their applicability, e.g. as separators or catalysts (J. Ka¨rger, D. Ruthven. Diffusion in zeolites, Wiley, New York (1991); L.V.C. Rees, D. Shen. Adsorption of gases in zeolite molecular sieves. In Introduction to Zeolite Science and Practice, Studies in surface science and catalysis, H.V.C. van Bekkum, E.M. Flanigen, P.A. Jacobs, J.C. Jansen (Eds.), vol. 137, pp. 579–631, Elsevier, Amsterdam (2001)). Adsorption in zeolites is explained as a two-step process; adsorption to the external crystal surface and subsequent intra-crystalline diffusion (R. M. Barrer. Porous crystal membranes. J. Chem. Soc. Faraday T…

General Chemical EngineeringDiffusion02 engineering and technology010402 general chemistryMolecular sieve01 natural sciencesIsothermal processCatalysis[PHYS.PHYS.PHYS-CHEM-PH] Physics [physics]/Physics [physics]/Chemical Physics [physics.chem-ph]Crystalchemistry.chemical_compoundAdsorptionGeneral Materials ScienceZeoliteComputingMilieux_MISCELLANEOUSChemistryButaneGeneral Chemistry021001 nanoscience & nanotechnologyCondensed Matter Physics0104 chemical sciences[CHIM.THEO]Chemical Sciences/Theoretical and/or physical chemistry[CHIM.THEO] Chemical Sciences/Theoretical and/or physical chemistry[ PHYS.PHYS.PHYS-CHEM-PH ] Physics [physics]/Physics [physics]/Chemical Physics [physics.chem-ph]13. Climate actionModeling and SimulationPhysical Sciences[ CHIM.THEO ] Chemical Sciences/Theoretical and/or physical chemistryPhysical chemistry[PHYS.PHYS.PHYS-CHEM-PH]Physics [physics]/Physics [physics]/Chemical Physics [physics.chem-ph]0210 nano-technologyInformation Systems
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THE GOLDMAN CONSTANT FIELD ASSUMPTION - SIGNIFICANCE AND APPLICABILITY CONDITIONS

1986

Ionic transport phenomena in simple, porous membranes can be approximately represented by the Nernst-Planck flux equations and Poisson's equation. In order to solve this set of equations for each particular case, the Goldman constant field assumption is one of the most widely used. In the present paper the significance and the applicability conditions of the above hypothesis is critically examined. and the particular situations where it is exact are shown. These conditions are later verified by solving numerically the electrodiffusion equations. The analysis carried out shows that some of the earlier studies based on asymptotic expansions and numerical solutions should be partially revised.

General Chemical EngineeringFluxConstant fieldPoisson distributionSet (abstract data type)symbols.namesakeSimple (abstract algebra)Porous membranesymbolsApplied mathematicsStatistical physicsDiffusion (business)Transport phenomenaMathematics
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A First Principles Study on Charge Dependent Diffusion of Point Defects in Rutile TiO2

2010

A first principles theoretical study on the diffusion mechanism of Ti interstitials and O vacancies in rutile TiO2 is reported. We find that the diffusion depends strongly on the defect charge. Wea...

General EnergyMaterials scienceOpticsCondensed matter physicsRutilebusiness.industryCharge (physics)Physical and Theoretical ChemistryDiffusion (business)businessCrystallographic defectSurfaces Coatings and FilmsElectronic Optical and Magnetic MaterialsThe Journal of Physical Chemistry C
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Logistic Growth Described by Birth-Death and Diffusion Processes

2019

We consider the logistic growth model and analyze its relevant properties, such as the limits, the monotony, the concavity, the inflection point, the maximum specific growth rate, the lag time, and the threshold crossing time problem. We also perform a comparison with other growth models, such as the Gompertz, Korf, and modified Korf models. Moreover, we focus on some stochastic counterparts of the logistic model. First, we study a time-inhomogeneous linear birth-death process whose conditional mean satisfies an equation of the same form of the logistic one. We also find a sufficient and necessary condition in order to have a logistic mean even in the presence of an absorbing endpoint. Then…

General MathematicsGompertz functionLogistic regressionConditional expectation01 natural sciencestransition probabilities03 medical and health sciencesFano factorComputer Science (miscellaneous)Applied mathematicsItô equationLimit (mathematics)0101 mathematicsLogistic functionStratonovich equationEngineering (miscellaneous)first-passage-time problem030304 developmental biologyMathematicslogistic model0303 health scienceslcsh:MathematicsItô equation010102 general mathematicsdiffusion processeslogistic model; birth-death process; first-passage-time problem; transition probabilities; Fano factor; coefficient of variation; diffusion processes; Itô equation; Stratonovich equation; diffusion in a potentiallcsh:QA1-939Birth–death processcoefficient of variationDiffusion processbirth-death processInflection pointdiffusion in a potentialMathematics
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A Quantitative Analysis of Metrics on Rn with Almost Constant Positive Scalar Curvature, with Applications to Fast Diffusion Flows

2017

We prove a quantitative structure theorem for metrics on $\mathbf{R}^n$ that are conformal to the flat metric, have almost constant positive scalar curvature, and cannot concentrate more than one bubble. As an application of our result, we show a quantitative rate of convergence in relative entropy for a fast diffusion equation in $\mathbf{R}^n$ related to the Yamabe flow.

General MathematicsYamabe flow010102 general mathematicsMathematical analysisMetric Geometry (math.MG)01 natural sciencesMathematics - Analysis of PDEsMathematics - Metric Geometry0103 physical sciencesFOS: Mathematics010307 mathematical physics0101 mathematicsDiffusion (business)Constant (mathematics)Quantitative analysis Yamabe flow fast diffusion flowQuantitative analysis (chemistry)Analysis of PDEs (math.AP)MathematicsScalar curvature
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On a Retarded Nonlocal Ordinary Differential System with Discrete Diffusion Modeling Life Tables

2021

In this paper, we consider a system of ordinary differential equations with non-local discrete diffusion and finite delay and with either a finite or an infinite number of equations. We prove several properties of solutions such as comparison, stability and symmetry. We create a numerical simulation showing that this model can be appropriate to model dynamical life tables in actuarial or demographic sciences. In this way, some indicators of goodness and smoothness are improved when comparing with classical techniques.

General Mathematicslattice dynamical systemslife tables010103 numerical & computational mathematics:CIENCIAS ECONÓMICAS [UNESCO]01 natural sciencesStability (probability)010104 statistics & probabilitydiscrete nonlocal diffusion problemsComputer Science (miscellaneous)Applied mathematics0101 mathematicsDiffusion (business)Engineering (miscellaneous)MathematicsDiffusion modelingSmoothness (probability theory)Computer simulationlcsh:MathematicsUNESCO::CIENCIAS ECONÓMICASlcsh:QA1-939Symmetry (physics)Ordinary differential systemordinary differential equationsOrdinary differential equationretarded equationsMathematics
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Mechanism of Anesthetic Action: Oxygen Pathway Perturbation Hypothesis

2001

Although more than 150 years have past since the discovery of general anesthetics, how they precisely work remains a mystery. We propose a novel unitary mechanism of general anesthesia verifiable by experiments. In the proposed mechanism, general anesthetics perturb oxygen pathways in both membranes and oxygen-utilizing proteins such that the availabilities of oxygen to its sites of utilization are reduced which in turn triggers cascading cellular responses through oxygen-sensing mechanisms resulting in general anesthesia. Despite the general assumption that cell membranes are readily permeable to oxygen, exiting publications indicate that these membranes are plausible oxygen transport barr…

General anestheticsStereochemistryFOS: Physical scienceschemistry.chemical_elementOxygenDiffusionmedicinePhysics - Biological PhysicsAnestheticsQP PhysiologyChemistryCell MembraneOxygen transportGeneral MedicineMembrane transportQD ChemistryPhysics - Medical PhysicsQuantitative BiologyOxygenMembraneBiological Physics (physics.bio-ph)FOS: Biological sciencesQ01 Interdisciplinary sciences (General)AnestheticMedical Physics (physics.med-ph)NeuroscienceQuantitative Biology (q-bio)medicine.drug
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Approximation of exit times for one-dimensional linear diffusion processes

2020

International audience; In order to approximate the exit time of a one-dimensional diffusion process, we propose an algorithm based on a random walk. Such an algorithm was already introduced in both the Brownian context and the Ornstein-Uhlenbeck context, that is for particular time-homogeneous diffusion processes. Here the aim is therefore to generalize this efficient numerical approach in order to obtain an approximation of both the exit time and position for a general linear diffusion. The main challenge of such a generalization is to handle with time-inhomogeneous diffusions. The efficiency of the method is described with particular care through theoretical results and numerical example…

GeneralizationOrder (ring theory)Context (language use)Exit timeRandom walk010103 numerical & computational mathematicsStochastic algorithmRandom walk01 natural sciencesLinear diffusion010101 applied mathematicsComputational MathematicsComputational Theory and MathematicsDiffusion processPosition (vector)Modeling and SimulationApplied mathematicsGeneralized spheroids[MATH]Mathematics [math]0101 mathematicsDiffusion (business)Brownian motionMathematicsComputers & Mathematics with Applications
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