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126 results on '"Amar, Micol"'

1. Periodic homogenization in the context of structured deformations

Author

Amar, Micol, Matias, José, Morandotti, Marco, and Zappale, Elvira

Subjects
Mathematics - Optimization and Control, 74Q05, 49J45, 74A60, 74M99
Abstract

An energy for first-order structured deformations in the context of periodic homogenization is obtained. This energy, defined in principle by relaxation of an initial energy of integral type featuring contributions of bulk and interfacial terms, is proved to possess an integral representation in terms of relaxed bulk and interfacial energy densities. These energy densities, in turn, are obtained via asymptotic cell formulae defined by suitably averaging, over larger and larger cubes, the bulk and surface contributions of the initial energy. The integral representation theorem, the main result of this paper, is obtained by mixing blow-up techniques, typical in the context of structured deformations, with the averaging process proper of the theory of homogenization.

Published
2022
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2. Well-posedness for a modified bidomain model describing bioelectric activity in damaged heart tissues

Author

Amar, Micol, Andreucci, Daniele, and Timofte, Claudia

Subjects
Mathematics - Analysis of PDEs, 35K90, 35A01, 35K20, 35Q92
Abstract

We prove the existence and the uniqueness of a solution for a modified bidomain model, describing the electrical behaviour of the cardiac tissue in pathological situations. The leading idea is to reduce the problem to an abstract parabolic setting, which requires to introduce several auxiliary differential systems and a non-standard bilinear form. The main difficulties are due to the degeneracy of the bidomain system and to its non-standard coupling with a diffusion equation, accounting for the presence of the pathological zone in the heart tissue., Comment: 19 pages, 1 figure. arXiv admin note: substantial text overlap with arXiv:2101.09112

Published
2021

3. Homogenization of a modified bidomain model involving imperfect transmission

Author

Amar, Micol, Andreucci, Daniele, and Timofte, Claudia

Subjects
Mathematics - Analysis of PDEs, 35B27, 35Q92, 35K20
Abstract

We study, by means of the periodic unfolding technique, the homogenization of a modified bidomain model, which describes the propagation of the action potential in the cardiac electrophysiology. Such a model, allowing the presence of pathological zones in the heart, involves various geometries and non-standard transmission conditions on the interface between the healthy and the damaged part of the cardiac muscle., Comment: 32 pages, 2 figures

Published
2021

4. Diffusion in inhomogeneous media with periodic microstructures

Author

Amar, Micol, Andreucci, Daniele, and Cirillo, Emilio N. M.

Subjects
Mathematics - Analysis of PDEs, Condensed Matter - Statistical Mechanics, Mathematical Physics
Abstract

Diffusion in inhomogeneous materials can be described by both the Fick and Fokker--Planck diffusion equations. Here, we study a mixed Fick and Fokker-Planck diffusion problem with coefficients rapidly oscillating both in space and time. We obtain macroscopic models performing the homogenization limit by means of the unfolding technique.

Published
2020

5. Well-posedness of two pseudo-parabolic problems for electrical conduction in heterogeneous media

Author

Amar, Micol, Andreucci, Daniele, Gianni, Roberto, and Timofte, Claudia

Subjects
Mathematics - Analysis of PDEs, 35A01, 35K70, 58J05, 35M33
Abstract

We prove a well-posedness result for two pseudo-parabolic problems, which can be seen as two models for the same electrical conduction phenomenon in heterogeneous media, neglecting the magnetic field. One of the problems is the concentration limit of the other one, when the thickness of the dielectric inclusions goes to zero. The concentrated problem involves a transmission condition through interfaces, which is mediated by a suitable Laplace-Beltrami type equation., Comment: 21 pages, 2 figures

Published
2020

6. Concentration and homogenization in electrical conduction in heterogeneous media involving the Laplace-Beltrami operator

Author

Amar, Micol, Andreucci, Daniele, Gianni, Roberto, and Timofte, Claudia

Subjects
Mathematics - Analysis of PDEs, 35B27 (primary) 35K70, 74Q10 (secondary)
Abstract

We study a concentration and homogenization problem modelling electrical conduction in a composite material. The novelty of the problem is due to the specific scaling of the physical quantities characterizing the dielectric component of the composite. This leads to the appearance of a peculiar displacement current governed by a Laplace-Beltrami pseudo-parabolic equation. This pseudo-parabolic character is present also in the homogenized equation, which is obtained by the unfolding technique., Comment: 36 pages, 3 figures

Published
2020

8. Asymptotic decay under nonlinear and noncoercive dissipative effects for electrical conduction in biological tissues

Author

Amar, Micol, Andreucci, Daniele, and Gianni, Roberto

Subjects
Mathematics - Analysis of PDEs, 35B40, 35B27, 45K05, 92C55
Abstract

We consider a nonlinear model for electrical conduction in biological tissues. The nonlinearity appears in the interface condition prescribed on the cell membrane. The purpose of this paper is proving asymptotic convergence for large times to a periodic solution when time-periodic boundary data are assigned. The novelty here is that we allow the nonlinearity to be noncoercive. We consider both the homogenized and the non-homogenized version of the problem.

Published
2015

10. On the Finsler metrics obtained as limits of chessboard structures

Author

Amar, Micol, Crasta, Graziano, and Malusa, Annalisa

Subjects
Mathematics - Analysis of PDEs, Mathematics - Metric Geometry, 35B27
Abstract

We study the geodesics in a planar chessboard structure with two values 1 and $\beta>1$. The results for a fixed structure allow us to infer the properties of the Finsler metrics obtained, with an homogenization procedure, as limit of oscillating chessboard structures., Comment: 31 pages, 15 figures

Published
2008
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14. '(Non) Azzardiamo con la Matematica'

Author

Amar, Micol, Andreucci, Daniele, Bersani, Alberto Maria, Capitanelli, Raffaela, D'Ovidio, Mirko, Pitolli, Francesca, Vantaggi, Barbara, and Zappale, Elvira

Published
2022

37. Time-periodic unfolding operator in parabolic homogenization

Author

Amar, Micol, Andreucci, Daniele, and Bellaveglia, Dario

Subjects
Parabolic diffusion equations, Homogenization, Periodic unfolding, Homogenization, Periodic unfolding, Time-oscillations, Parabolic diffusion equations, Time-oscillations
Published
2017

46. LAPLACE-BELTRAMI OPERATOR FOR THE HEAT CONDUCTION IN POLYMER COATING OF ELECTRONIC DEVICES.

Author

Amar, Micol and Gianni, Roberto

Subjects
ELECTRONIC equipment, POLYMERS, SURFACE coatings, OPERATOR theory, MICROSCOPY, HEAT conduction, PARTIAL differential equations
Abstract

In this paper we study a model for the heat conduction in a composite having a microscopic structure arranged in a periodic array. We obtain the macroscopic behaviour of the material and specifically the overall conductivity via an homogenization procedure, providing the equation satisfied by the effective temperature. [ABSTRACT FROM AUTHOR]

Published
2018
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