We study controllability for a nonhomogeneous string and ring under an axial stretching
tension that varies with time. We consider the boundary control for a string and
distributed control for a ring. For a string, we are looking for a control
f(t) ∈ L2(0,
T) that drives the state solution to rest. We show that for a ring, two forces
are required to achieve controllability. The controllability problem is reduced to a
moment problem for the control. We describe the set of initial data which may be driven to
rest by the control. The proof is based on an auxiliary basis property result.