Euler-Bernoulli beam
WELL-POSEDNESS AND EXPONENTIAL DECAY FOR THE EULER-BERNOULLI BEAM CONVEYING FLUID EQUATION WITH NON-CONSTANT VELOCITY AND DYNAMICAL BOUNDARY CONDITIONS
... Euler-Bernoulli beam conveying fluid equations are found in many practical applications. They are used to model for instance risers of offshore platforms, pipes carrying chemical fluids, exhaust ...
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Transverse vibration analysis of Euler-Bernoulli beam carrying point masse submerged in fluid media
... Keywords: Euler-Bernoulli beam; Fluid-structure interaction; Finite element method; Frequency equation; Inertial ...a beam or rod carrying masses are frequently used as design models in ...
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Fractional integro-differential boundary control of the Euler-Bernoulli beam
... The analysis and the numerical approximation of the system under consideration are considerably simpli- fied by using diffusive input-output realizations of Abel fractional integ[r] ...
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Vibration Analysis of Euler-Bernoulli Beams Partially Immersed in a Viscous Fluid
... immersed beam decreases the natural frequencies from those that would be measured in the ...The Euler- Bernoulli beam is partially immersed inside rectangular ...
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Sparse EEG Source Localization Using Bernoulli Laplacian Priors
... Abstract—Source localization in electroencephalography has re- ceived an increasing amount of interest in the last decade. Solving the underlying ill-posed inverse problem usually requires choosing an appropriate ...
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From Bernoulli-Gaussian deconvolution to sparse signal restoration
... a Bernoulli-Gaussian signal ...(MAP) Bernoulli-Gaussian restoration which results in an adaptation of SMLR to subset ...the Bernoulli-Gaussian model and the Bayesian framework from which we formulate ...
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Kummer congruences for expressions involving generalized Bernoulli polynomials
... generalized Bernoulli numbers can then be defined by = If we let Z [x] denote the ring generated over Z by all of the values x(a), a E Z, then it can be shown that fxB,,,x must be in Z[x] for each n > 0, ...
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Hedgehog theory via Euler calculus
... 2. Euler calculus Euler calculus is an integration theory built with the Euler characteristic as a …nitely additive measure. Born in the sheaf theory, it has applications to algebraic topology, to ...
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Sparse EEG Source Localization Using Bernoulli Laplacian Priors
... a Bernoulli–Laplace prior in a distributed source model for the estimation of the activity of focal point-like ...the Bernoulli part of the prior) and their amplitudes to be estimated (with the Laplace ...
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Approximations de relations d'équivalence standards et percolation de Bernoulli à p_u
... RELATIONS AND BERNOULLI PERCOLATION AT p u DAMIEN GABORIAU AND ROBIN TUCKER-DROB Résumé. The goal of this note is to announce certain results (to appear in [GTD15]) in orbit equivalence theory, especially ...
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Étude théorique et numérique de la modélisation instationnaire des écoulements turbulents anisothermes gaz-particules par une approche Euler-Euler
... R´ esum´ e Le contexte g´en´eral de cette th`ese s’inscrit dans le cadre de la mod´elisation eul´erienne instationnaire des ´ecoulements turbulents anisothermes gaz - particules. La mod´elisation de ces ´ecoulements est ...
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Exceptional zeros of L-series and Bernoulli-Carlitz numbers
... p diverges, then it is reasonable to expect that there exist infinitely many prime numbers p such that Bp−k ≡ 0 (mod p). Let Fq be a finite field having q elements, q being a power of a prime number p, and let θ be an ...
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Ramanujan–Bernoulli numbers as moments of Racah polynomials
... The sequence R − seems to have first appeared, in a slightly implicit way and up to an easy power of 2, in an article of Ludwig Seidel from 1877 [9], as the main diagonal of the difference table of the Bernoulli ...
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Fast Numerical Methods for Bernoulli Free Boundary Problems
... BOUNDARY PROBLEMS CHRISTOPHER M. KUSTER ∗ , PIERRE A. GREMAUD † , AND RACHID TOUZANI ‡ Abstract. The numerical solution of the free boundary Bernoulli problem is addressed. An iterative method based on a ...
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Euler-Euler large eddy simulations of the gas–liquid flow in a cylindrical bubble column
... better than the Smagorinsky model with 𝐶 𝑆 = 0.08 in the central plume and vortical flow regions. The Smagorinsky model improves the resolved axial liquid velocity profile in the near-wall region. The effect of inlet ...
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Sparse signal recovery using a Bernoulli generalized Gaussian prior
... (6) where λ > 0 and p > 0 are the scale and shape parame- ters, and Γ(.) denotes the gamma function. In (5), δ(.) is the Dirac delta function and ω is a weight belonging to [0, 1]. The adopted BGG model promotes a ...
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A Bernoulli problem with non constant gradient boundary constraint
... CHIARA BIANCHINI A BSTRACT . We present in this paper a result about existence and convexity of solutions to a free boundary problem of Bernoulli type, with non constant gradient boundary constraint depending on ...
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Sparse signal recovery using a Bernoulli generalized Gaussian prior
... ! (6) where λ > 0 and p > 0 are the scale and shape parame- ters, and Γ(.) denotes the gamma function. In (5), δ(.) is the Dirac delta function and ω is a weight belonging to [0, 1]. The adopted BGG model promotes ...
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EULER-EULER MODELLING OF THE INTERACTION OF A GAS-PARTICLE MIXTURE WITH A DETACHED SHOCK
... Key words: Multiphase flows, Gas-particle mixtures, Shock Disturbance. Abstract. This work deals with the interaction of a mist of solid particles and a stationary detached shock wave. Experiments over a 3 inches sphere ...
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Large time behavior and asymptotic stability of the two-dimensional Euler and linearized Euler equations
... 2D Euler equations), Brunet and coauthors [16, 14] have studied the dynamics close to a parabolic jet when the potential vorticity gradient exactly cancels the β ...the Euler equations studied by Kelvin, ...
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