Null controllability of the parabolic spherical Grushin equation
Abstract
We investigate the null controllability property of the parabolic equation associated with the Grushin operator defined by the canonical almost-Riemannian structure on the 2-dimensional sphere S2. This is the natural generalization of the Grushin operator G = ∂x2 + x2∂y2 on R2 to this curved setting, and presents a degeneracy at the equator of S2. We prove that the null controllability is verified in large time when the control acts as a source term distributed on a subset ω = \ (x1,x2,x3)∈ S2 α<|x3|<β\ for some 0α<β 1. More precisely, we show the existence of a positive time T*>0 such that the system is null controllable from ω in any time T T*, and that the minimal time of control from ω satisfies Tmin(1/1-α2). Here, the lower bound corresponds to the Agmon distance of ω from the equator. These results are obtained by proving a suitable Carleman estimate by using unitary transformations and Hardy-Poincaré type inequalities to show the positive null-controllability result. The negative statement is proved by exploiting an appropriate family of spherical harmonics, which concentrates at the equator, to falsify the uniform observability inequality.
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