Optimal cost for the null controllability of the Stokes system with controls having n-1 components and applications

Abstract

In this work, we investigate the optimal cost of null controllability for the n-dimensional Stokes system when the control acts on n-1 scalar components. We establish a novel spectral estimate for low frequencies of the Stokes operator, involving solely n-1 components, and use it to show that the cost of controllability with controls having n-1 components remains of the same order in time as in the case of controls with n components, namely O(eC/T), i.e. the cost of null controllability is not affected by the absence of one component of the control. We also give several applications of our results.

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