Differential dynamic programming
Differential dynamic programming (DDP) is an optimal control algorithm of the trajectory optimization class. The algorithm was introduced in 1966 by Mayne[1] and subsequently analysed in Jacobson and Mayne's eponymous book.[2] The algorithm uses locally-quadratic models of the dynamics and cost functions, and displays quadratic convergence. It is closely related to Pantoja's step-wise Newton's method.[3][4]
Finite-horizon discrete-time problems
The dynamics
-
(1)
describe the evolution of the state given the control from time to time . The total cost is the sum of running costs and final cost , incurred when starting from state and applying the control sequence until the horizon is reached:
where , and the for are given by Eq. 1. The solution of the optimal control problem is the minimizing control sequence Trajectory optimization means finding for a particular , rather than for all possible initial states.
Dynamic programming
Let be the partial control sequence and define the cost-to-go as the partial sum of costs from to :
The optimal cost-to-go or value function at time is the cost-to-go given the minimizing control sequence:
Setting , the dynamic programming principle reduces the minimization over an entire sequence of controls to a sequence of minimizations over a single control, proceeding backwards in time:
-
(2)
This is the Bellman equation.
Differential dynamic programming
DDP proceeds by iteratively performing a backward pass on the nominal trajectory to generate a new control sequence, and then a forward-pass to compute and evaluate a new nominal trajectory. We begin with the backward pass. If
is the argument of the operator in Eq. 2, let be the variation of this quantity around the -th pair:
and expand to second order
-
(3)
The notation used here is a variant of the notation of Morimoto where subscripts denote differentiation in denominator layout.[5] Dropping the index for readability, primes denoting the next time-step , the expansion coefficients are
The last terms in the last three equations denote contraction of a vector with a tensor. Minimizing the quadratic approximation (3) with respect to we have
-
(4)
giving an open-loop term and a feedback gain term . Plugging the result back into (3), we now have a quadratic model of the value at time :
Recursively computing the local quadratic models of and the control modifications , from down to , constitutes the backward pass. As above, the Value is initialized with . Once the backward pass is completed, a forward pass computes a new trajectory:
The backward passes and forward passes are iterated until convergence.
Regularization and line-search
Differential dynamic programming is a second-order algorithm like Newton's method. It therefore takes large steps toward the minimum and often requires regularization and/or line-search to achieve convergence [6] .[7] Regularization in the DDP context means ensuring that the matrix in Eq. 4 is positive definite. Line-search in DDP amounts to scaling the open-loop control modification by some .
Monte Carlo version
Sampled differential dynamic programming (SaDDP) is a Monte Carlo variant of differential dynamic programming.[8][9][10] It is based on treating the quadratic cost of differential dynamic programming as the energy of a Boltzmann distribution. This way the quantities of DDP can be matched to the statistics of a multidimensional normal distribution. The statistics can be recomputed from sampled trajectories without differentiation.
Sampled differential dynamic programming has been extended to Path Integral Policy Improvement with Differential Dynamic Programming.[11] This creates a link between differential dynamic programming and path integral control,[12] which is a framework of stochastic optimal control.
Constrained problems
Interior Point Differential dynamic programming (IPDDP) is an interior-point method generalization of DDP that can address the optimal control problem with nonlinear state and input constraints. [13]
See also
References
- Mayne, D. Q. (1966). "A second-order gradient method of optimizing non-linear discrete time systems". Int J Control. 3: 85–95. doi:10.1080/00207176608921369.
- Mayne, David H. and Jacobson, David Q. (1970). Differential dynamic programming. New York: American Elsevier Pub. Co. ISBN 978-0-444-00070-5.
- de O. Pantoja, J. F. A. (1988). "Differential dynamic programming and Newton's method". International Journal of Control. 47 (5): 1539–1553. doi:10.1080/00207178808906114. ISSN 0020-7179.
- Liao, L. Z.; C. A Shoemaker (1992). "Advantages of differential dynamic programming over Newton's method for discrete-time optimal control problems". Cornell University, Ithaca, NY. hdl:1813/5474. Cite journal requires
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(help) - Morimoto, J.; G. Zeglin; C.G. Atkeson (2003). "Minimax differential dynamic programming: Application to a biped walking robot". Intelligent Robots and Systems, 2003.(IROS 2003). Proceedings. 2003 IEEE/RSJ International Conference on. 2. pp. 1927–1932.
- Liao, L. Z; C. A Shoemaker (1991). "Convergence in unconstrained discrete-time differential dynamic programming". IEEE Transactions on Automatic Control. 36 (6): 692. doi:10.1109/9.86943.
- Tassa, Y. (2011). Theory and implementation of bio-mimetic motor controllers (PDF) (Thesis). Hebrew University. Archived from the original (PDF) on 2016-03-04. Retrieved 2012-02-27.
- "Sampled differential dynamic programming - IEEE Conference Publication". doi:10.1109/IROS.2016.7759229. Cite journal requires
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(help) - "Regularizing Sampled Differential Dynamic Programming - IEEE Conference Publication". ieeexplore.ieee.org. Retrieved 2018-10-19.
- Joose, Rajamäki (2018). Random Search Algorithms for Optimal Control. Aalto University. ISBN 9789526081564. ISSN 1799-4942.
- Lefebvre, Tom; Crevecoeur, Guillaume (July 2019). "Path Integral Policy Improvement with Differential Dynamic Programming". 2019 IEEE/ASME International Conference on Advanced Intelligent Mechatronics (AIM): 739–745. doi:10.1109/AIM.2019.8868359. hdl:1854/LU-8623968.
- Theodorou, Evangelos; Buchli, Jonas; Schaal, Stefan (May 2010). "Reinforcement learning of motor skills in high dimensions: A path integral approach". 2010 IEEE International Conference on Robotics and Automation: 2397–2403. doi:10.1109/ROBOT.2010.5509336.
- Pavlov, Andrei; Shames, Iman; Manzie, Chris (2020). "Interior Point Differential Dynamic Programming". arXiv:2004.12710 [math.OC].