Gabriele Bruell scite author profile

This paper is concerned with decay and symmetry properties of solitary wave solutions to a nonlocal shallow water wave model. It is shown that all supercritical solitary wave solutions are symmetric and monotone on either side of the crest. The proof is based on a priori decay estimates and the method of moving planes. Furthermore, a close relation between symmetric and traveling wave solutions is established

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On the Thin Film Muskat and the Thin Film Stokes Equations

Bruell

Granero-Belinchón

2019

J. Math. Fluid Mech.

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The present paper is concerned with the analysis of two strongly coupled systems of degenerate parabolic partial differential equations arising in multiphase thin film flows. In particular, we consider the two-phase thin film Muskat problem and the two-phase thin film approximation of the Stokes flow under the influence of both, capillary and gravitational forces.The existence of global weak solutions for medium size initial data in large function spaces is proved. Moreover, exponential decay results towards the equilibrium state are established, where the decay rate can be estimated by explicit constants depending on the physical parameters of the system. Eventually, it is shown that if the initial datum satisfies additional (low order) Sobolev regularity, we can propagate Sobolev regularity for the corresponding solution. The proofs are based on a priori energy estimates in Wiener and Sobolev spaces.

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Waves of maximal height for a class of nonlocal equations with homogeneous symbols

Bruell¹,

Dhara²

2021

Indiana Univ. Math. J.

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We discuss the existence and regularity of periodic traveling-wave solutions of a class of nonlocal equations with homogeneous symbol of order´r, where r ą 1. Based on the properties of the nonlocal convolution operator, we apply analytic bifurcation theory and show that a highest, peaked, periodic traveling-wave solution is reached as the limiting case at the end of the main bifurcation curve. The regularity of the highest wave is proved to be exactly Lipschitz. As an application of our analysis, we reformulate the steady reduced Ostrovsky equation in a nonlocal form in terms of a Fourier multiplier operator with symbol mpkq " k´2. Thereby we recover its unique highest 2π-periodic, peaked traveling-wave solution, having the property of being exactly Lipschitz at the crest.

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Modeling and analysis of a two-phase thin film model with insoluble surfactant

Bruell

2016

Nonlinear Analysis: Real World Applications

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Abstract. In this paper we consider a two-phase thin film consisting of two immiscible viscous fluids endowed with a layer of insoluble surfactant on the surface of the upper fluid.The governing equations for the two film heights and the surfactant concentration are derived using a lubrication approximation. Taking gravitational forces into account but neglecting capillary effects, the resulting system of evolution equations is parabolic, strongly coupled, of second order and degenerated in the equations for the two film heights. Incorporating on the contrary capillary forces and neglecting the effects of gravitation, the system of evolution equations is parabolic, degenerated and of fourth-order for the film heights, strongly coupled to a second-order transport equation for the surfactant concentration. Local well-posedness and asymptotic stability are shown for both systems.

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Symmetry of Periodic Traveling Waves for Nonlocal Dispersive Equations

Bruell¹,

Pei²

2023

SIAM J. Math. Anal.

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Gabriele Bruell

Symmetry and decay of traveling wave solutions to the Whitham equation

On the Thin Film Muskat and the Thin Film Stokes Equations

Waves of maximal height for a class of nonlocal equations with homogeneous symbols

Modeling and analysis of a two-phase thin film model with insoluble surfactant

Symmetry of Periodic Traveling Waves for Nonlocal Dispersive Equations

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