Wave propagation in abstract dynamical system with boundary control

Abstract

Let L0 be a positive definite operator in a Hilbert space H with the defect indexes n≥slant 1 and let \ Ker\,L*0;1,2\ be its canonical (by M.I.Vishik) boundary triple. The paper deals with an evolutionary dynamical system of the form align* & utt+L0* u=0 &&in\,\, H,\,\,\,t>0;\\ & u|t=0=ut|t=0=0 && in\,\, H;\\ & 1 u=f(t), && t≥slant 0, align* where f is a boundary control (a Ker\,L*0-valued function of time), u=uf(t) is a trajectory. Some of the general properties of such systems are considered. An abstract analog of the finiteness principle of wave propagation speed is revealed.