An optimal control problem subject to strong solutions of chemotaxis-consumption models

Abstract

We consider a bilinear optimal control problem associated to the following chemotaxis-consumption model in a bounded domain ⊂ R3 during a time interval (0,T): ∂t u - u = - ∇ · (u ∇ v), ∂t v - v = - us v + f v 1_c, with s ≥ 1, endowed with isolated boundary conditions and initial conditions for (u,v), u being the cell density, v the chemical concentration and f the bilinear control acting in a subdomain c ⊂ . The existence of weak solutions (u,v) to this model given f ∈ Lq((0,T) × ), for some q > 5/2, has been proved in [F. Guill\'en-Gonz\'alez and A. L. Corr\ea Vianna Filho, Optimal Control Related to Weak Solutions of a Chemotaxis-Consumption Model, arXiv:2211.14612, 2022]. In this paper, we study a related optimal control problem in the strong solution setting. First, imposing the regularity criterion u s ∈ Lq((0,T) × ) (q > 5/2) for a given weak solution, we prove existence and uniqueness of global-in-time strong solutions. Then, the existence of a global optimal solution can be deduced. Finally, using a Lagrange multipliers theorem, we establish first order optimality conditions for any local optimal solution, proving existence, uniqueness and regularity of the associated Lagrange multipliers.