A priori estimates and strong solvability results in Sobolev space W 2,p(Ω), 1 < p < ∞ are proved for the regular oblique derivative problem 8<: Pni,j=1 aij(x) ∂u ∂xi∂xj = f(x) a.e. Ω ∂u ∂l + σ(x)u =… (More)

After briefly discussing the Internet of Things and Cyber physical device main features, their application in a specific architecture for a simple distributed intelligent system was presented. The… (More)

This papers deals with PI and PID control of second order systems with an input hysteresis described by a modified Prandtl-Ishlinskii model. The problem of the asymptotic tracking of constant… (More)

We deal with linear parabolic (in sense of Petrovskii) systems of order 2b with discontinuous principal coefficients. A'priori estimates in Sobolev and Sobolev– Morrey spaces are proved for the… (More)

This article presents a study of the regular oblique derivative problem n ∑ i,j=1 a(x) ∂2u ∂xi∂xj = f(x) ∂u ∂`(x) + σ(x)u = φ(x) . Assuming that the coefficients aij belong to the Sarason’s class of… (More)

In this paper, the preliminary results of the research project “Monitoraggio continuo per le Acque refiue Urbane ed Industriali per l'ecoindustria” (MAUI) are depicted. Specifically, innovative… (More)

Advances in remote sensing technology are now providing tools to support geospatial mapping of the soil properties for the application to the management of agriculture and the environment. In this… (More)

We derive W 2,p( )-a priori estimates with arbitrary p ∈ (1,∞), for the solutions of a degenerate oblique derivative problem for linear uniformly elliptic operators with low regular coefficients. The… (More)