Some conditional optimization problems with constraints in the form of operator equations. The Pontryagin maximum principle (Q5938982)

An optimization problem with connections to functional equations of the form \[ A*u+B(k)*u=f, \] \[ J(k,u) \to \min, \quad k \in K, \quad A(k)*u=f(k), \] is considered, where \(A+B(k)\) is an operator, \(u\) is the control function, and \(f(k)\) is a given function. The necessary condition for optimality on the base of the maximum principle is proved.