Add to ORKGA. We prove that the fractional heat equations posed on the whole Euclidean space ℝ and associated with the operators (−∆) ∕2 are exactly null-controllable from control supports which are sufficiently "exponentially thick", when 0 1. Inspired by the construction of the Smith-Volterra-Cantor sets, we also provide examples of non-trivial exponentially thick control supports
In this work, the exponential stability of the nonlocal fractional heat equation is studied. The fra...
Abstract. This paper introduces a “spectral observability condition ” for a negative self-adjoint op...
International audienceWe study the partial Gelfand-Shilov regularizing effect and the exponential de...
A. We prove that the fractional heat equations posed on the whole Euclidean space ℝ and associated w...
We study the null-controllability properties of heat-like equations posed on the whole Euclidean spa...
We prove that the thickness property is a necessary and sufficient geometric condition that ensures ...
Abstract: We study the null-controllability property of the linear heat equation on the half-space w...
We consider the null controllability problem from the exterior for the one dimensional heat equation...
We prove that the approximate null-controllability with uniform cost of the hypoelliptic Ornstein-Uh...
We address three null controllability problems related to the $1-d$ heat equation. First we show tha...
Motivated by two recent works of Micu and Zuazua and Cabanillas, De Menezes and Zuazua, we study t...
We prove in this article that the Kolmogorov-type equation $(\partial_t -\partial_v^2 + v^2\partial_...
AbstractIn this paper we analyze the approximate and null controllability of the classical heat equa...
This paper is concerned with the null controllability of systems governed by semilinear parabolic e...
Abstract. In this paper, we prove the global null controllability of the linear heat equation comple...
In this work, the exponential stability of the nonlocal fractional heat equation is studied. The fra...
Abstract. This paper introduces a “spectral observability condition ” for a negative self-adjoint op...
International audienceWe study the partial Gelfand-Shilov regularizing effect and the exponential de...
A. We prove that the fractional heat equations posed on the whole Euclidean space ℝ and associated w...
We study the null-controllability properties of heat-like equations posed on the whole Euclidean spa...
We prove that the thickness property is a necessary and sufficient geometric condition that ensures ...
Abstract: We study the null-controllability property of the linear heat equation on the half-space w...
We consider the null controllability problem from the exterior for the one dimensional heat equation...
We prove that the approximate null-controllability with uniform cost of the hypoelliptic Ornstein-Uh...
We address three null controllability problems related to the $1-d$ heat equation. First we show tha...
Motivated by two recent works of Micu and Zuazua and Cabanillas, De Menezes and Zuazua, we study t...
We prove in this article that the Kolmogorov-type equation $(\partial_t -\partial_v^2 + v^2\partial_...
AbstractIn this paper we analyze the approximate and null controllability of the classical heat equa...
This paper is concerned with the null controllability of systems governed by semilinear parabolic e...
Abstract. In this paper, we prove the global null controllability of the linear heat equation comple...
In this work, the exponential stability of the nonlocal fractional heat equation is studied. The fra...
Abstract. This paper introduces a “spectral observability condition ” for a negative self-adjoint op...
International audienceWe study the partial Gelfand-Shilov regularizing effect and the exponential de...