In this paper, we consider the problem of learning a neural network
controller for a system required to satisfy a Signal Temporal Logic (STL)
specification. We exploit STL quantitative semantics to define a notion of
robust satisfaction. Guaranteeing the correctness of a neural network
controller, i.e., ensuring the satisfaction of the specification by the
controlled system, is a difficult problem that received a lot of attention
recently. We provide a general procedure to construct a set of trainable High
Order Control Barrier Functions (HOCBFs) enforcing the satisfaction of formulas
in a fragment of STL. We use the BarrierNet, implemented by a differentiable
Quadratic Program (dQP) with HOCBF constraints, as the last layer of the neural
network controller, to guarantee the satisfaction of the STL formulas. We train
the HOCBFs together with other neural network parameters to further improve the
robustness of the controller. Simulation results demonstrate that our approach
ensures satisfaction and outperforms existing algorithms.Comment: Submitted to CDC 202