On the exact boundary controllability of semilinear wave equations

Abstract

We address the exact boundary controllability of the semilinear wave equation ∂tty- y + f(y)=0 posed over a bounded domain of Rd. Assuming that f is continuous and satisfies the condition r ∞ f(r) /( r p r)≤ β for some β small enough and some p∈ [0,3/2), we apply the Schauder fixed point theorem to prove the uniform controllability for initial data in L2()× H-1(). Then, assuming that f is in C1(R) and satisfies the condition r ∞ f(r)/p r≤ β, we apply the Banach fixed point theorem and exhibit a strongly convergent sequence to a state-control pair for the semilinear equation.