Uniform observability estimates for linear waves

In this article, we give a completely constructive proof of the observability/controllability of the wave equation on a compact manifold under optimal geometric conditions. This contrasts with the original proof of Bardos-Lebeau-Rauch, which contains two non-constructive arguments. Our method is based on the Dehman-Lebeau Egorov approach to treat the high-frequencies, and the optimal unique continuation stability result of the authors for the low-frequencies. As an application, we first give estimates of the blowup of the observability constant when the time tends to the limit geometric control time (for wave equations with possibly lower order terms). Second, we provide (on manifolds with or without boundary) with an explicit dependence of the observability constant with respect to the addition of a bounded potential to the equation.