Boundary stabilization of focusing NLKG near unstable equilibria: radial case

Abstract

We investigate the stability and stabilization of the cubic focusing Klein-Gordon equation around static solutions on the closed ball of radius L in R3. First we show that the system is linearly unstable near the static solution u 1 for any dissipative boundary condition ut+ au=0, a∈ (0, 1). Then by means of boundary controls (both open-loop and closed-loop) we stabilize the system around this equilibrium exponentially under the condition 2L≠ 2L. Furthermore, we show that the equilibrium can be stabilized with any rate less than 22L 1+a1-a, provided (a,L) does not belong to a certain zero set. This rate is sharp.