Interior Point Differential Dynamic Programming, Redux

We present IPDDP2, a structure-exploiting algorithm for solving discrete-time, finite horizon optimal control problems with nonlinear constraints. Inequality constraints are handled using a primal-dual interior point formulation and step acceptance for equality constraints follows a line-search filter approach. The iterates of the algorithm are derived under the Differential Dynamic Programming (DDP) framework. Our numerical experiments evaluate IPDDP2 on four robotic motion planning problems. IPDDP2 reliably converges to low optimality error and exhibits local quadratic and global convergence from remote starting points. Notably, we showcase the robustness of IPDDP2 by using it to solve a contact-implicit, joint limited acrobot swing-up problem involving complementarity constraints from a range of initial conditions. We provide a full implementation of IPDDP2 in the Julia programming language.