January 2023
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22 Reads
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13 Citations
Communications in Mathematical Sciences
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January 2023
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22 Reads
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13 Citations
Communications in Mathematical Sciences
July 2018
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73 Reads
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2 Citations
Analele Stiintifice ale Universitatii Ovidius Constanta, Seria Matematica
In this paper we review some results obtained for a distributed control problem regarding a class of phase field systems of Caginalp type with logarithmic potential. The aim of the control problem is forcing the location of the diffuse interface to be as close as possible to a prescribed set. However, due to some discontinuity in the cost functional, we have to regularize it and solve the related control problem for the approximation. We discuss the necessary optimality conditions.
July 2017
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34 Reads
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20 Citations
Archive for Rational Mechanics and Analysis
In this paper we study a model for phase separation and damage in thermoviscoelastic materials. The main novelty of the paper consists in the fact that, in contrast with previous works in the literature (cf., e.g., [C. Heinemann, C. Kraus: Existence results of weak solutions for Cahn-Hilliard systems coupled with elasticity and damage. Adv. Math. Sci. Appl. 21 (2011), 321--359] and [C. Heinemann, C. Kraus: Existence results for diffuse interface models describing phase separation and damage. European J. Appl. Math. 24 (2013), 179--211]), we encompass in the model thermal processes, nonlinearly coupled with the damage, concentration and displacement evolutions. More in particular, we prove the existence of "entropic weak solutions", resorting to a solvability concept first introduced in [E. Feireisl: Mathematical theory of compressible, viscous, and heat conducting fluids. Comput. Math. Appl. 53 (2007), 461--490] in the framework of Fourier-Navier-Stokes systems and then recently employed in [E. Feireisl, H. Petzeltov\'a, E. Rocca: Existence of solutions to a phase transition model with microscopic movements. Math. Methods Appl. Sci. 32 (2009), 1345--1369], [E. Rocca, R. Rossi: "Entropic" solutions to a thermodynamically consistent PDE system for phase transitions and damage. SIAM J. Math. Anal., 47 (2015), 2519--2586] for the study of PDE systems for phase transition and damage. Our global-in-time existence result is obtained by passing to the limit in a carefully devised time-discretization scheme.
May 2017
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84 Reads
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1 Citation
GAMM-Mitteilungen
We present here a model for instantaneous collisions in a solid made of shape memory alloys (SMA) by means of a predictive theory which is based on the introduction not only of macroscopic velocities and temperature, but also of microscopic velocities responsible of the austenite-martensites phase changes. Assuming time discontinuities for velocities, volume fractions and temperature, and applying the principles of thermodynamics for non-smooth evolutions together with constitutive laws typical of SMA, we end up with a system of nonlinearly coupled elliptic equations for which we prove an existence and uniqueness result in the 2 and 3 D cases. Finally, we also present numerical results for a SMA 2D solid subject to an external percussion by an hammer stroke.
March 2017
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128 Reads
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92 Citations
We consider a diffuse interface model for tumor growth recently proposed in [Y. Chen, S.M. Wise, V.B. Shenoy, J.S. Lowengrub, A stable scheme for a nonlinear, multiphase tumor growth model with an elastic membrane, Int. J. Numer. Methods Biomed. Eng., 30 (2014), 726-754]. In this new approach sharp interfaces are replaced by narrow transition layers arising due to adhesive forces among the cell species. Hence, a continuum thermodynamically consistent model is introduced. The resulting PDE system couples four different types of equations: a Cahn-Hilliard type equation for the tumor cells (which include proliferating and dead cells), a Darcy law for the tissue velocity field, whose divergence may be different from 0 and depend on the other variables, a transport equation for the proliferating (viable) tumor cells, and a quasi-static reaction diffusion equation for the nutrient concentration. We establish existence of weak solutions for the PDE system coupled with suitable initial and boundary conditions. In particular, the proliferation function at the boundary is supposed to be nonnegative on the set where the velocity satisfies , where is the outer normal to the boundary of the domain. We also study a singular limit as the diffuse interface coefficient tends to zero.
January 2017
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47 Reads
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6 Citations
Lecture Notes in Mathematics -Springer-verlag-
The main goal of this book is to provide an overview of the state of the art in the mathematical modeling of complex fluids, with particular emphasis on its thermodynamical aspects. The central topics of the text, the modeling, analysis and numerical simulation of complex fluids, are of great interest and importance both for the understanding of various aspects of fluid dynamics and for its applications to special real-world problems. New emerging trends in the subject are highlighted with the intent to inspire and motivate young researchers and PhD students.
January 2016
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76 Reads
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9 Citations
SIAM Journal on Mathematical Analysis
A PDE system consisting of the momentum balance, mass balance, and energy balance equations for displacement, capillary pressure, and temperature as a model for unsaturated fluid flow in a porous viscoelastoplastic solid is shown to admit a solution under appropriate assumptions on the constitutive behavior. The problem involves two hysteresis operators accounting for plastic and capillary hysteresis.
... Based on this viscoelastic approach, some very interesting models that describe the motion of two-phase flows have been introduced in very recent years. Readers are referred to Agosti et al. (2023) for a phase-field model coupled with viscoelasticity with large deformations, and Kim et al. (2022) for a diffuse interface model describing the interaction between blood flow and a thrombus with Hookean elasticity during the stage of atherosclerotic lesion in human artery. ...
January 2023
Communications in Mathematical Sciences
... Besides, for the model of tumor growth, Colli, Gilardi, Rocca and Sprekels [7] considered the distributed optimal control problems for a diffuse interface model of tumor growth, and we also read literatures [10,28,29] for this aspect. Colli, Gilardi, Marinoschi and Rocca [5,6] studied the optimal control problems for a phase-field system with singular potential. Liu and Zhang [17] discussed the optimal distributed control for a new mechanochemical model in biological patterns. ...
July 2018
Analele Stiintifice ale Universitatii Ovidius Constanta, Seria Matematica
... This feature is the key for the extreme responsivity of nematics to external stimuli, which in turn is the reason why they are so useful in technological applications. Macroscopic configurations of nematics are usually described by continuum theories, the most successful being the phenomenological Landau-de Gennes (LdG) theory [3,15,48,65] which accounts for the most convincing description of the experimentally observed optical defects [33,38]. In the present article, the first in a series of three, we study minimizing configurations of the Landau-de Gennes energy functional in three dimensional domains under a Dirichlet boundary condition (or strong anchoring condition in the NLC terminology [3]). ...
January 2017
Lecture Notes in Mathematics -Springer-verlag-
... It is possible to prove that the set of partial differential equations when neglecting the dissipative work due to phase changes, has solutions in a convenient variational framework, [30]. This results insures the coherency of the theory and of its numerical approximations by classical numerical methods. ...
Reference:
Shape Memory Alloys and Collisions
May 2017
GAMM-Mitteilungen
... Such problems have been studied by introducing a continuum mechanical model and inserting different parameters for the two branches of the capillary pressure curve in Albers. 1,2 Another approach to the problem consists in modeling hysteresis by an explicit hysteresis operator and solving the resulting operator-PDE system as in Albers and Krejčí 3,4 and Detmann et al. 5 The present article follows the structure of the two latter papers. The intention is to describe processes in porous media containing more than two pore fluids. ...
January 2016
SIAM Journal on Mathematical Analysis
... Following Gurtin's approach [Gur96], our system can be derived starting from balance laws for the involved quantities and then imposing constitutive assumptions so that the system satisfies the second law of thermodynamics, which, in the case of an isothermal system like ours, is written in the form of an energy dissipation inequality (see e.g. [Gar+16;Hei+17]). The Cahn-Hilliard equation of the system (1.1a)-(1.1b) is derived from the mass balance law ...
July 2017
Archive for Rational Mechanics and Analysis
... In the literature some formal results regarding passages to the sharp interface limit are available (cf., e.g., [20,28]), but, up to our knowledge, no rigorous theorems are proved for coupled systems as (0.1). Indeed, in the papers [11,37] and [40] the authors investigated the existence of weak solutions and some rigorous sharp interface limit in two simplified cases. In [11,37] only the coupling between the Cahn-Hilliard equation and the Darcy law for the velocities is considered and, in particular, in [11] the physically meaningful case of a double-well potential in the Cahn-Hilliard equation cannot be accounted. ...
March 2017