Titlebook: Control and Inverse Problems; The 2022 Spring Work Ka?s Ammari,Chaker Jammazi,Faouzi Triki Conference proceedings 2023 The Editor(s) (if ap

修正案

Wie Bürokratie ?behindert‘ machton, none of them appealing to the notion of mollification. In this paper, we propose to use mollification, in its ., to regularize the NPIR problem. We demonstrate that applying mollification yields a stable and consistent estimator.

regale

Christian Hunkler,Jasper TjadenCarleman estimates for scalar equations are deeply studied by now; however the case of the system these kinds of estimates sill rather very limited in the literature. In this paper we are focusing on a such type of situation in order to establish a local Carleman estimate and to apply it for the stabilization of a dissipative hyperbolic system.

observatory

Wie Bürokratie ?behindert‘ machtThis paper is addressed to study the Carleman estimates for the linearized version of the sixth-order 1-d Boussinesq equation. As an application, we also solve an inverse problem retrieving the space-dependent source term of the nonlinear sixth-order Boussinesq equation from boundary measurements.

北極熊

ARENA

Extort

Carleman Estimate and Application to the Stabilization of a Dissipative Hyperbolic System,Carleman estimates for scalar equations are deeply studied by now; however the case of the system these kinds of estimates sill rather very limited in the literature. In this paper we are focusing on a such type of situation in order to establish a local Carleman estimate and to apply it for the stabilization of a dissipative hyperbolic system.

隱士

Feckless

Dispersion on Certain Cartesian Products of Graphs,In this short note, we prove a sharp dispersive estimate . for any Cartesian product . of the integer lattice and a finite graph. This includes the infinite ladder, .-strips, and infinite cylinders, which can be endowed with certain potentials.

pulmonary-edema

chisel