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Journals and Conferences
We prove a semicontinuity theorem for an integral functional made up by a polyconvex energy and a surface term. Our result extends to the BV framework a well known result by John Ball.
We give a definition for Obstacle Problems with measure data and general obstacles. For such problems we prove existence and uniqueness of solutions and consistency with the classical theory of Variational Inequalities. Continuous dependence with respect to data is discussed. Ref. S.I.S.S.A. 147/97/M (November 97) Obstacles problems with measure data 1
We study the convergence properties of the solutions of some elliptic obstacle problems with measure data, under the simultaneous perturbation of the operator, the forcing term and the obstacle. Stability results for obstacle problems with measure data 1
Background: Although exposure to endocrine disruptor compounds (EDCs) has been suggested as a contributing factor to a range of women's health disorders including infertility, polycystic ovaries and the early onset of puberty, considerable challenges remain in attributing cause and effect on gynaecological cancer. Until recently, there were relatively few… (More)
This paper presents the demonstration of an ultra compact High Temperature Cofired Ceramic (HTCC) based down converter for satellite on board processing equipment. The down converter is composed of three sections: the RF Front end in KU Band, the first IF at 400 MHz and a base-band chain at 50 MHz. The overall gain is of 90dB and the OIP3 is of 20 dBm. GaAs… (More)
Synchrony and asynchrony are essential aspects of the functioning of interconnected neuronal cells and networks. New information on neuronal synchronization can be expected to aid in understanding these systems. Synchronization provides insight in the functional connectivity and the spatial distribution of the information processing in the networks.… (More)
We prove higher differentiability of bounded local minimizers to some widely degenerate functionals, verifying superquadratic anisotropic growth conditions. In the two dimensional case, we prove that local minimizers to a model functional are locally Lipschitz continuous functions, without any restriction on the anisotropy.
We prove a lower semicontinuity result for free discontinuity energies with a quasiconvex volume term having non standard growth and a surface term.
Emilius Aalto1,2, Fabrizio Capoccioni3,4*, Juan Terradez Mas2, Marcello Schiavina5, Chiara Leone3, Giulio De Leo1, and Eleonora Ciccotti3 Hopkins Marine Station (Department of Biology) and Woods Institute for the Environment, Stanford University, CA, USA Dipartimento di Bioscienze, Università degli studi di Parma, Via Università 12, Parma 43121, Italy… (More)