Nadia Ansini scite author profile

We study the behaviour of non-convex functionals singularly perturbed by a possibly oscillating inhomogeneous gradient term, in the spirit of the gradient theory of phase transitions. We show that a limit problem giving a sharp interface, as the perturbation vanishes, always exists, but may be inhomogeneous or anisotropic. We specialize this study when the perturbation oscillates periodically, highlighting three types of regimes, depending on the frequency of the oscillations. In the two extreme cases, a separation of scales effect is described

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Homogenization of oscillating boundaries and applications to thin films

Ansini

Braides

2001

J. Anal. Math.

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On the lower semicontinuity of supremal functional under differential constraints

Ansini

Prinari

2015

ESAIM: COCV

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We study the weak* lower semicontinuity of functionals of the formThe notion of A-Young quasiconvexity, which is introduced here, provides a sufficient condition when f (x, •) is only lower semicontinuous. We also establish necessary conditions for weak* lower semicontinuity. Finally, we discuss the divergence and curl-free cases and, as an application, we characterise the strength set in the context of electrical resistivity.

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Nadia Ansini

Asymptotic analysis of periodically-perforated nonlinear media

Gradient theory of phase transitions in composite media

Homogenization of oscillating boundaries and applications to thin films

On the lower semicontinuity of supremal functional under differential constraints

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