Reinforcement learning algorithms that use deep neural networks are a promising approach for the development of machines that can acquire knowledge and solve problems without human input or supervision. At present, however, these algorithms are implemented in software running on relatively standard complementary metal–oxide–semiconductor digital platforms, where performance will be constrained by the limits of Moore’s law and von Neumann architecture. Here, we report an experimental demonstration of reinforcement learning on a three-layer 1-transistor 1-memristor (1T1R) network using a modified learning algorithm tailored for our hybrid analogue–digital platform. To illustrate the capabilities of our approach in robust in situ training without the need for a model, we performed two classic control problems: the cart–pole and mountain car simulations. We also show that, compared with conventional digital systems in real-world reinforcement learning tasks, our hybrid analogue–digital computing system has the potential to achieve a significant boost in speed and energy efficiency.
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The computer code used in this study can be found at https://github.com/zhongruiwang/memristor_RL.
The data that support the plots within this paper and other findings of this study are available from the corresponding authors upon request.
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This work was supported in part by the US Air Force Research Laboratory (AFRL) (Grant No. FA8750-15-2-0044), the Defense Advanced Research Projects Agency (DARPA) (Contract No. D17PC00304), the Intelligence Advanced Research Projects Activity (IARPA) (Contract 2014-14080800008) and the National Science Foundation (NSF) (ECCS-1253073). Any opinions, findings and conclusions or recommendations expressed in this material are those of the authors and do not necessarily reflect the views of AFRL. Part of the device fabrication was conducted in the clean room of the Centre for Hierarchical Manufacturing (CHM), an NSF Nanoscale Science and Engineering Centre (NSEC) located at the University of Massachusetts Amherst.
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Supplementary Figures 1–8, Supplementary Tables 1–7 and Supplementary Note 1.
The in situ online reinforcement learning process of the cart-pole environment with the 1T1R memristor crossbar array. The upper-left panel shows the evolution of performance, or the summed rewards per game epoch, of the learning agent. The performance clearly improved during the second half of the learning course. The middle-left panel shows the evolution of the loss function at each game step. The lower-left panel shows the game information including the cart position and pole angle at each time step. The remaining three panels of the first row show the real-time conductance maps of the memristor synapses of the three-layer neural networks during learning. The differential memristor pair orientation is vertical in layers 1 and 2 and horizontal in layer 3 (that is, for layer 1 and 2, adjacent rows form differential pairs, while for layer 3, adjacent columns form differential pairs.) The remaining three panels of the second row show the corresponding real-time weight matrices of the three-layer neural network based on the conductance reading of differential pairs. The remaining three panels of the last row show the gate voltage maps calculated by the RMSprop optimizer of the three-layer neural network at each time step.
The in situ online reinforcement learning process of the mountain car environment with the 1T1R memristor crossbar array. The upper-left panel shows the evolution of performance, or the summed rewards per game epoch, of the learning agent. The negative rewards clearly decreased in amplitude after the first epoch. The middle-left panel shows the evolution of the loss function at each game step. The lower-left panel shows the game information about the car position at each time step. The remaining three panels of the first row show the real-time conductance maps of the memristor synapses of the three-layer neural networks during learning. The differential pair orientation is vertical in layers 1 and 2 while horizontal in layer 3. (that is, for layer 1 and 2, adjacent rows form differential pairs, while for layer 3, adjacent columns form differential pairs.) The remaining three panels of the second row show the corresponding real-time weight matrices of the three-layer neural network based on the conductance readings of differential pairs. The remaining three panels of the last row show the gate voltage maps calculated by the RMSprop optimizer of the three-layer neural network at each time step.
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Wang, Z., Li, C., Song, W. et al. Reinforcement learning with analogue memristor arrays. Nat Electron 2, 115–124 (2019). https://doi.org/10.1038/s41928-019-0221-6
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