Optimal-control theory applied to ship maneuvering in restricted waters

Abstract

Ship drivers have long understood that powerful interaction forces exist when ships operate in close proximity to rigid boundaries or other vessels. Controlling the effects of these forces has been traditionally handled by experienced helmsmen. The purpose of this study is to apply modern optimal-control theory to such maneuvering scenarios in order to show that helmsmen may some day be replaced by modern controllers. The maneuvering equations of motion are cast in a linear state-space framework, permitting the design of a linear quadratic (LQ) controller. The hydrodynamic effects are modeled using potential-flow theory in order to simulate the interaction forces and test the performance of the controller. This study demonstrates that the linear quadratic regulator effectively controls ship motions due to the presence of a boundary or other vessel over a broad range of speeds and separation distances. Viscous effects are modeled by equivalent linearization and, when compared to the effective damping introduced by the controller, are shown to be insignificant. © Springer Science + Business Media B.V. 2007.