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On asymptotic exit-time control problems lacking coercivity

M. MottaC. Sartori — 2014

ESAIM: Control, Optimisation and Calculus of Variations

The research on a class of asymptotic exit-time problems with a vanishing Lagrangian, begun in [M. Motta and C. Sartori, Springer (2014).] for the compact control case, is extended here to the case of unbounded controls and data, including both coercive and non-coercive problems. We give sufficient conditions to have a well-posed notion of generalized control problem and obtain regularity, characterization and approximation results for the value function of the problem.

Stability estimates for an inverse problem for the linear Boltzmann equation.

Rolci CipolattiCarlos M. MottaNilson C. Roberty — 2006

Revista Matemática Complutense

In this paper we consider the inverse problem of recovering the total extinction coefficient and the collision kernel for the time-dependent Boltzmann equation via boundary measurements. We obtain stability estimates for the extinction coefficient in terms of the albedo operator and also an identification result for the collision kernel.

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