• Convex Integration Arising in the Modelling of Shape-Memory Alloys: Some Remarks on Rigidity, Flexibility and Some Numerical Implementations 

  Rüland, A.; Taylor J. M.; Zillinger, C. (Journal of Nonlinear Science, 2019-03-30)

  We study convex integration solutions in the context of the modelling of shape-memory alloys. The purpose of the article is twofold, treating both rigidity and flexibility prop- erties: Firstly, we relate the maximal ...

• Topological singular set of vector-valued maps, I: application to manifold-constrained Sobolev and BV spaces 

  Canevari G.; Orlandi G. (Calculus of Variations and Partial Differential Equations, 2019-03-30)

  We introduce an operator $\mathbf{S}$ on vector-valued maps $u$ which has the ability to capture the relevant topological information carried by $u$. In particular, this operator is defined on maps that take values in a ...

• Order Reconstruction for neatics on squares with isotropic inclusions: A Landau-de Gennes study 

  Wang Y.; Canevari G.; Majumdar A. (SIAM Journal on Applied Mathematics, 2019-03-30)

  e study a modified Landau-de Gennes model for nematic liq- uid crystals, where the elastic term is assumed to be of subquadratic growth in the gradient. We analyze the behaviour of global minimizers in two- and three-dimensional ...

• The excluded volume of two-dimensional convex bodies: shape reconstruction and non-uniqueness 

  Taylor J. M. (Journal of Physics A: Mathematical and Theoretical, 2019-02-05)

  In the Onsager model of one-component hard-particle systems, the entire phase behaviour is dictated by a function of relative orientation, which represents the amount of space excluded to one particle by another at this ...

• Asymptotic models for free boundary flow in porous media 

  Granero-Belinchón R.; Scrobogna S. (Physica D, 2019)

  We provide rigorous asymptotic models for the free boundary Darcy and Forchheimer problem under the assumption of weak nonlinear interaction, in a regime in which the steepness parameter of the interface is considered to ...

• On the influence of gravity on density-dependent incompressible periodic fluids 

  Ngo V.-S.; Scrobogna S. (J. Differential Equations, 2019)

  The present work is devoted to the analysis of density-dependent, incompressible fluids in a 3D torus, when the Froude number $\varepsilon$ goes to zero. We consider the very general case where the initial data do not have ...

• A Global well-posedness result for the Rosensweig system of ferrofluids 

  Scrobogna S.; De Anna F. (Rev. Mat. Iberoam., 2019)

  In this Paper we study a Bloch-Torrey regularization of the Rosensweig system for ferrofluids. The scope of this paper is twofold. First of all, we investigate the existence and uniqueness of Leray-Hopf solutions of this ...

• Uniqueness of degree-one Ginzburg–Landau vortex in the unit ball in dimensions N ≥ 7 

  Ignat R.; Nguyen L.; Slastikov V.; Zarnescu A. (Comptes Rendus Mathematique, 2018-09-01)

  For ε>0, we consider the Ginzburg-Landau functional for RN-valued maps defined in the unit ball BN⊂RN with the vortex boundary data x on ∂BN. In dimensions N≥7, we prove that for every ε>0, there exists a unique global ...

• Shear flow dynamics in the Beris-Edwards model of nematic liquid crystals 

  Murza A.C.; Teruel A.E.; Zarnescu A. (Proceedings of the Royal Society A-Mathematical, Physical and Engineering Sciences, 2018-02-14)

  We consider the Beris-Edwards model describing nematic liquid crystal dynamics and restrict to a shear flow and spatially homogeneous situation. We analyze the dynamics focusing on the effect of the flow. We show that in ...

• Dynamics and flow effects in the Beris-Edwards system modeling nematic liquid crystals 

  Hao W; Xiang X; Zarnescu A (Archive for Rational Mechanics and Analysis, 2018-08-10)

  We consider the Beris-Edwards system modelling incompressible liquid crystal flows of nematic type. This couples a Navier-Stokes system for the fluid velocity with a parabolic reaction-convection-diffusion equation for the ...

• Some remark on the existence of infinitely many nonphysical solutions to the incompressible Navier-Stokes equations 

  Scrobogna S. (Journal of Mathematical Analysis and Applications, 2018-10)

  We prove that there exist infinitely many distributional solutions with infinite kinetic energy to both the incompressible Navier-Stokes equations in $ \mathbb{R}^2 $ and Burgers equation in $\mathbb{R} $ with vanishing ...

• On the global well-posedness of a class of 2D solutions for the Rosensweig system of ferrofluids 

  Scrobogna S. (Journal of Differential Equations, 2018-09)

  We study a class of 2D solutions of a Bloch-Torrey regularization of the Rosensweig system in the whole space, which arise when the initial data and the external magnetic field are 2D. We prove that such solutions are ...

• Defects in Nematic Shells: a Gamma-convergence discrete-to-continuum approach 

  Canevari G.; Segatti A. (Archive for Rational Mechanics and Analysis, 2018-07)

  In this paper we rigorously investigate the emergence of defects on Nematic Shells with a genus different from one. This phenomenon is related to a non-trivial interplay between the topology of the shell and the alignment ...

• Zero limit of entropic relaxation time for the Shliomis model of ferrofluids 

  Scrobogna S. (2018-02-11)

  We construct solutions for the Shilomis model of ferrofluids in a critical space, uniformly in the entropic relaxation time $ \tau \in (0, \tau_0) $. This allows us to study the convergence when $ \tau\to 0 $ for such solutions.

• On a hyperbolic system arising in liquid crystal modelling 

  Fereisl E.; Rocca E.; Schimperna G.; Zarnescu A. (Journal of Hyperbolic Differential Equations, 2017-11)

  We consider a model of liquid crystals, based on a nonlinear hyperbolic system of differential equations, that represents an inviscid version of the model proposed by Qian and Sheng. A new concept of dissipative solution ...

• Sphere-valued harmonic maps with surface energy and the K13 problem 

  Day S.; Zarnescu A. (Advances in the Calculus of Variations, 2017-11)

  We consider an energy functional motivated by the celebrated K13 problem in the Oseen-Frank theory of nematic liquid crystals. It is defined for sphere-valued functions and appears as the usual Dirichlet energy with an ...

• Global well-posedness and twist-wave solutions for the inertial Qian-Sheng model of liquid crystals 

  de Anna F.; Zarnescu A. (Journal of Differential Equations, 2017-10-02)

  We consider the inertial Qian-Sheng model of liquid crystals which couples a hyperbolic-type equation involving a second-order material derivative with a forced incompressible Navier-Stokes system. We study the energy law ...

• Dispersive effects of weakly compressible and fast rotating inviscid fluids 

  Ngo V.-S; Scrobogna S. (Discrete and Continuous Dynamical Systems - Series A, 2017-08)

  We consider a system describing the motion of an isentropic, inviscid, weakly compressible, fast rotating fluid in the whole space $\mathbb{R}^3$, with initial data belonging to $ H^s \left( \mathbb{R}^3 \right), s>5/2 $. ...

• Highly rotating fluids with vertical stratification for periodic data and vanishing vertical viscosity 

  Scrobogna S. (Revista Matemática Iberoamericana, 2017-07)

  We prove that the three-dimensional, periodic primitive equations with zero vertical diffusivity are globally well posed if the Rossby and Froude number are sufficiently small. The initial data is considered to be of zero ...

• Derivation of limit equation for a singular perturbation of a 3D periodic Boussinesq system 

  Scrobogna S. (Discrete and Continuous Dynamical Systems - Series A, 2017-07-15)

  We consider a system describing the dynamics of an hydrodynamical, density-dependent flow under the effects of gravitational forces. We prove that if the Froude number is sufficiently small such system is globally well ...

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