S. B. de Menezes scite author profile

This paper deals with the control of a differential turbulence model of the Ladyzhenskaya-Smagorinsky kind. In the equations we find local and nonlocal nonlinearities: the usual transport terms and a turbulent viscosity that depends on the global in space energy dissipated by the mean flow. We prove that the system is locally null-controllable, with distributed controls locally supported in space. The proof relies on rather well known arguments. However, some specific difficulties are found here because of the occurrence of nonlocal nonlinear terms. We also present an iterative algorithm of the quasi-Newton kind that provides a sequence of states and controls that converge towards a solution to the control problem. Finally, we give the details of a numerical approximation and we illustrate the behavior of the algorithm with a numerical experiment.

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S. B. de Menezes

Null Controllability in Unbounded Domains for the Semilinear Heat Equation with Nonlinearities Involving Gradient Terms

Null controllability for a parabolic equation with nonlocal nonlinearities

Existence of solutions to nonlocal and singular variational elliptic inequality via Galerkin method

On the controllability of a free-boundary problem for the 1D heat equation

Theoretical and Numerical Local Null Controllability of a Ladyzhenskaya–Smagorinsky Model of Turbulence

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