Response of a Tethered Aerostat to Simulated Turbulence

Design Engineering ◽

10.1115/imece2004-59166 ◽

2004 ◽

Author(s):

Keith A. Stanney ◽

Christopher D. Rahn

Keyword(s):

Atmospheric Turbulence ◽

Initial Conditions ◽

Probability Distributions ◽

Decomposition Theorem ◽

Worst Case ◽

Gaussian Density ◽

Time Histories ◽

Wind Input ◽

Non Gaussian ◽

Proper Orthogonal

Aerostats are lighter-than-air vehicles tethered to the ground by a cable and used for broadcasting, communications, surveillance, and drug interdiction. The dynamic response of tethered aerostats subject to extreme atmospheric turbulence often dictates survivability. This paper develops a theoretical model that predicts the planar response of a tethered aerostat subject to atmospheric turbulence and simulates the response to 1000 simulated hurricane scale turbulent time histories. The aerostat dynamic model assumes the aerostat hull to be a rigid body with nonlinear fluid loading, instantaneous weathervaning for planar response, and a continuous tether. Galerkin’s method discretizes the coupled aerostat and tether partial differential equations to produce a nonlinear initial value problem that is integrated numerically given initial conditions and wind inputs. The proper orthogonal decomposition theorem generates, based on Hurricane Georges wind data, turbulent time histories that possess the sequential behavior of actual turbulence, are spectrally accurate, and have non-Gaussian density functions. The generated turbulent time histories are simulated to predict the aerostat response to severe turbulence. The resulting probability distributions for the aerostat position, pitch angle, and confluence point tension predict the aerostat behavior in high gust environments. The results uncover a worst case wind input consisting of a two-pulse vertical gust.

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Cusp of Non-Gaussian Density of Particles for a Diffusing Diffusivity Model

Entropy ◽

10.3390/e23020231 ◽

2021 ◽

Vol 23 (2) ◽

pp. 231

Author(s):

M. Hidalgo-Soria ◽

E. Barkai ◽

S. Burov

Keyword(s):

Diffusion Coefficient ◽

Initial Conditions ◽

Waiting Times ◽

Effective Diffusion ◽

Time Behavior ◽

Mean Values ◽

Gaussian Density ◽

Long Time ◽

Non Gaussian ◽

Short Time

We study a two state “jumping diffusivity” model for a Brownian process alternating between two different diffusion constants, D+>D−, with random waiting times in both states whose distribution is rather general. In the limit of long measurement times, Gaussian behavior with an effective diffusion coefficient is recovered. We show that, for equilibrium initial conditions and when the limit of the diffusion coefficient D−⟶0 is taken, the short time behavior leads to a cusp, namely a non-analytical behavior, in the distribution of the displacements P(x,t) for x⟶0. Visually this cusp, or tent-like shape, resembles similar behavior found in many experiments of diffusing particles in disordered environments, such as glassy systems and intracellular media. This general result depends only on the existence of finite mean values of the waiting times at the different states of the model. Gaussian statistics in the long time limit is achieved due to ergodicity and convergence of the distribution of the temporal occupation fraction in state D+ to a δ-function. The short time behavior of the same quantity converges to a uniform distribution, which leads to the non-analyticity in P(x,t). We demonstrate how super-statistical framework is a zeroth order short time expansion of P(x,t), in the number of transitions, that does not yield the cusp like shape. The latter, considered as the key feature of experiments in the field, is found with the first correction in perturbation theory.

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Passive target tracking with non Gaussian initial conditions

1999 European Control Conference (ECC) ◽

10.23919/ecc.1999.7099491 ◽

1999 ◽

Author(s):

D. G. Lainiotis ◽

P. K. Giannakopoulos ◽

S. K. Katsikas

Keyword(s):

Target Tracking ◽

Initial Conditions ◽

Passive Target Tracking ◽

Non Gaussian

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Modelling with star-shaped distributions

Dependence Modeling ◽

10.1515/demo-2020-0003 ◽

2020 ◽

Vol 8 (1) ◽

pp. 45-69

Author(s):

Eckhard Liebscher ◽

Wolf-Dieter Richter

Keyword(s):

Probabilistic Models ◽

Arbitrary Dimension ◽

Probability Density Functions ◽

Density Functions ◽

Wide Range ◽

Gaussian Density ◽

Spherical Distributions ◽

Data Points ◽

Non Gaussian ◽

General Method

AbstractWe prove and describe in great detail a general method for constructing a wide range of multivariate probability density functions. We introduce probabilistic models for a large variety of clouds of multivariate data points. In the present paper, the focus is on star-shaped distributions of an arbitrary dimension, where in case of spherical distributions dependence is modeled by a non-Gaussian density generating function.

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Experimental Investigation vs Numerical Simulation of the Dynamic Response of a Moored Floating Structure to Waves

Volume 8B: Ocean Engineering ◽

10.1115/omae2014-24064 ◽

2014 ◽

Author(s):

Daniele Dessi ◽

Sara Siniscalchi Minna

Keyword(s):

Dynamical Behavior ◽

Irregular Waves ◽

Mooring Line ◽

Floating Structure ◽

Mooring Lines ◽

Wave Energy Converters ◽

Time Histories ◽

Actual Configuration ◽

Proper Orthogonal ◽

Dynamic Wave

A combined numerical/theoretical investigation of a moored floating structure response to incoming waves is presented. The floating structure consists of three bodies, equipped with fenders, joined by elastic cables. The system is also moored to the seabed with eight mooring lines. This corresponds to an actual configuration of a floating structure used as a multipurpose platform for hosting wind-turbines, aquaculture farms or wave-energy converters. The dynamic wave response is investigated with numerical simulations in regular and irregular waves, showing a good agreement with experiments in terms of time histories of pitch, heave and surge motions as well as of the mooring line forces. To highlight the dynamical behavior of this complex configuration, the proper orthogonal decomposition is used for extracting the principal modes by which the moored structure oscillates in waves giving further insights about the way waves excites the structure.

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Non-Gaussian probability distributions of solar wind fluctuations

Annales Geophysicae ◽

10.1007/s00585-994-1127-8 ◽

1994 ◽

Vol 12 (12) ◽

pp. 1127-1138 ◽

Cited By ~ 102

Author(s):

E. Marsch ◽

C. Y. Tu

Keyword(s):

Solar Wind ◽

Probability Distributions ◽

Time Lag ◽

Small Scale ◽

Time Lags ◽

Mhd Turbulence ◽

Theoretical Concepts ◽

Fluid Turbulence ◽

Long Time ◽

Non Gaussian

Abstract. The probability distributions of field differences ∆x(τ)=x(t+τ)-x(t), where the variable x(t) may denote any solar wind scalar field or vector field component at time t, have been calculated from time series of Helios data obtained in 1976 at heliocentric distances near 0.3 AU. It is found that for comparatively long time lag τ, ranging from a few hours to 1 day, the differences are normally distributed according to a Gaussian. For shorter time lags, of less than ten minutes, significant changes in shape are observed. The distributions are often spikier and narrower than the equivalent Gaussian distribution with the same standard deviation, and they are enhanced for large, reduced for intermediate and enhanced for very small values of ∆x. This result is in accordance with fluid observations and numerical simulations. Hence statistical properties are dominated at small scale τ by large fluctuation amplitudes that are sparsely distributed, which is direct evidence for spatial intermittency of the fluctuations. This is in agreement with results from earlier analyses of the structure functions of ∆x. The non-Gaussian features are differently developed for the various types of fluctuations. The relevance of these observations to the interpretation and understanding of the nature of solar wind magnetohydrodynamic (MHD) turbulence is pointed out, and contact is made with existing theoretical concepts of intermittency in fluid turbulence.

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Adaptive distributed partitioning filters: non-gaussian initial conditions

Stochastic Analysis and Applications ◽

10.1080/07362999908809610 ◽

1999 ◽

Vol 17 (3) ◽

pp. 405-419

Author(s):

Demetrios G. Lainiotis ◽

Pavlos K. Giannakopoulos ◽

Sokrates K. Katsikas

Keyword(s):

Initial Conditions ◽

Non Gaussian

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Numerical simulation of soliton gas within the Korteweg-de Vries type equations

Вычислительные технологии ◽

10.25743/ict.2019.24.2.005 ◽

2019 ◽

pp. 52-66

Author(s):

Екатерина Геннадьевна Диденкулова ◽

Анна Витальевна Кокорина ◽

Алексей Викторович Слюняев

Keyword(s):

Numerical Scheme ◽

Initial Conditions ◽

Probability Distributions ◽

Scattering Problem ◽

Spectral Composition ◽

Computation Time ◽

Qualitative Description ◽

Statistical Characteristics ◽

De Vries ◽

Pseudo Spectral Method

Приведены детали численной схемы и способа задания начальных условий для моделирования нерегулярной динамики ансамблей солитонов в рамках уравнений типа Кортевега-де Вриза на примере модифицированного уравнения Кортевега-де Вриза с фокусирующим типом нелинейности. Дано качественное описание эволюции статистических характеристик для ансамблей солитонов одной и разных полярностей. Обсуждаются результаты тестовых экспериментов по столкновению большого числа солитонов. The details of the numerical scheme and the method of specifying the initial conditions for the simulation of the irregular dynamics of soliton ensembles within the framework of equations of the Korteweg - de Vries type are given using the example of the modified Korteweg - de Vries equation with a focusing type of nonlinearity. The numerical algorithm is based on a pseudo-spectral method with implicit integration over time and uses the Crank-Nicholson scheme for improving the stability property. The aims of the research are to determine the relationship between the spectral composition of the waves (the Fourier spectrum or the spectrum of the associated scattering problem) and their probabilistic properties, to describe transient processes and the equilibrium states. The paper gives a qualitative description of the evolution of statistical characteristics for ensembles of solitons of the same and different polarities, obtained as a result of numerical simulations; the probability distributions for wave amplitudes are also provided. The results of test experiments on the collision of a large number of solitons are discussed: the choice of optimal conditions and the manifestation of numerical artifacts caused by insufficient accuracy of the discretization. The numerical scheme used turned out to be extremely suitable for the class of the problems studied, since it ensures good accuracy in describing collisions of solitons with a short computation time.

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