The spectrum of the adjoint representation and the hyperbolicity of dynamical systems

We study the time \(T\)-map \(U\) which maps initial data \(\left(u_{0}, u_{1}\right)\) to the solution and its derivative \(\left(u(T), u_{d}(T)\right)\) of the homogeneous wave equation in a domain with time \(T\)-periodic boundary. The spectrum of \(U\) and the type of the spectrum are completely

## Abstract Many heat transfer situations are adequately described by the parabolic thermal diffusion equation. However, in situations in which very rapid heating occurs or in slower heating regimes for particular materials, the hyperbolic heat conduction equation is a better representation. Here,

Let \(\{T(t)\}_{1 \geqslant 0}\) be a \(C_{0}\)-semigroup in a Banach space \(X\) with generator \(A\). We prove that if \(\{T(t)\}_{t \geqslant 0}\) is bounded and sun-reflexive, and the sun-dual semigroup is not asymptotically stable, then there exist bounded complete trajectories under \(\{T(t)\}

A technique Jor the computation of optimal control is illustrated which avoids the need to solve the system equation. Its applicability to distributed parameter systems with distributed or boundary control is shown.