Your search keyword '"Menegatti, Giorgio"' showing total 3 results

1. Gradient contractivity of a rescaled resolvent on domains in Wiener spaces

Author

Addona, Davide, Menegatti, Giorgio, and Miranda Jr, Michele

Subjects

Mathematics - Analysis of PDEs, Mathematics - Functional Analysis, Mathematics - Probability

Abstract

Given an abstract Wiener space $(X,\gamma,H)$, we consider an open set $O\subseteq X$ which satisfies certain smoothness and mean-curvature conditions. We prove that the rescaled resolvent operator associated to the Ornstein-Uhlenbeck operator with homogeneous Dirichlet boundary conditions on $O$ is gradient contractive in $L^p(X,\gamma)$ for every $p\in(1,\infty)$. This is the Gaussian counterpart of an analogous result for the rescaled resolvent operator associated to the Laplace operator $\Delta$ in $L^p$ with respect to the Lebesgue measure, $p\in[1,\infty)$, with homogeneous Dirichlet boundary conditions on a bounded convex open set $O\subseteq \mathbb R^n$.

Published

2024

2. Characterizations of Sobolev spaces on sublevel sets in abstract Wiener spaces

Author

Addona, Davide, Menegatti, Giorgio, and Miranda Jr, Michele

Subjects

Mathematics - Functional Analysis, Mathematics - Analysis of PDEs, Mathematics - Probability

Abstract

In this paper we consider an abstract Wiener space $(X,\gamma,H)$ and an open subset $O\subseteq X$ which satisfies suitable assumptions. For every $p\in(1,+\infty)$ we define the Sobolev space $W_{0}^{1,p}(O,\gamma)$ as the closure of Lipschitz continuous functions which support with positive distance from $\partial O$ with respect to the natural Sobolev norm, and we show that under the assumptions on $O$ the space $W_{0}^{1,p}(O,\gamma)$ can be characterized as the space of functions in $W^{1,p}(O,\gamma)$ which have null trace at the boundary $\partial O$, or, equivalently, as the space of functions defined on $O$ whose trivial extension belongs to $W^{1,p}(X,\gamma)$.

Published

2022

3. Stability for the acoustic scattering problem for sound-hard scatterers

Author

Menegatti, Giorgio and Rondi, Luca

Subjects

Mathematics - Analysis of PDEs, Primary 35P25. Secondary 49J45

Abstract

We study the stability for the direct acoustic scattering problem with sound-hard scatterers with minimal regularity assumptions on the scatterers. The main tool we use for this purpose is the convergence in the sense of Mosco. We obtain uniform decay estimates for scattered fields and we investigate how a sound-hard screen may be approximated by thin sound-hard obstacles., Comment: 23 pages

Published

2013