Optimal growth for linear processes with affine control

Abstract

We analyse an optimal control with the following features: the dynamical system is linear, and the dependence upon the control parameter is affine. More precisely we consider xα(t) = (G + α(t) F)xα(t), where G and F are 3× 3 matrices with some prescribed structure. In the case of constant control α(t) α, we show the existence of an optimal Perron eigenvalue with respect to varying α under some assumptions. Next we investigate the Floquet eigenvalue problem associated to time-periodic controls α(t). Finally we prove the existence of an eigenvalue (in the generalized sense) for the optimal control problem. The proof is based on the results by [Arisawa 1998, Ann. Institut Henri Poincar\'e] concerning the ergodic problem for Hamilton-Jacobi equations. We discuss the relations between the three eigenvalues. Surprisingly enough, the three eigenvalues appear to be numerically the same.