Observability inequalities for transport equations through Carleman estimates

Abstract

We consider the transport equation t u(x,t) + H(t)· ∇ u(x,t) = 0 in ×(0,T), where T>0 and ⊂ d is a bounded domain with smooth boundary . First, we prove a Carleman estimate for solutions of finite energy with piecewise continuous weight functions. Then, under a further condition which guarantees that the orbits of H intersect , we prove an energy estimate which in turn yields an observability inequality. Our results are motivated by applications to inverse problems.