Null-controllability for weakly dissipative heat-like equations
Abstract
We study the null-controllability properties of heat-like equations posed on the whole Euclidean space Rn. These evolution equations are associated with Fourier multipliers of the form ( Dx), where [0,+∞)→ C is a measurable function such that is bounded from below. We consider the ``weakly dissipative'' case, a typical example of which is given by the fractional heat equations associated with the multipliers () = s in the regime s∈(0,1), for which very few results exist. We identify sufficient conditions and necessary conditions on the control supports for the null-controllability to hold. More precisely, we prove that these equations are null-controllable in any positive time from control supports which are sufficiently thick at all scales. Under assumptions on the multiplier , in particular assuming that () = o(), we also prove that the null-controllability implies that the control support is thick at all scales, with an explicit lower bound of the thickness ratio in terms of the multiplier . Finally, using Smith-Volterra-Cantor sets, we provide examples of non-trivial control supports that satisfy these necessary or sufficient conditions.
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