Saiedeh Akbari

Saiedeh Akbari, Emily J. Griffis, Omkar Sudhir Patil et al.

Deep neural network (DNN)-based adaptive controllers can be used to compensate for unstructured uncertainties in nonlinear dynamic systems. However, DNNs are also very susceptible to overfitting and co-adaptation. Dropout regularization is an approach where nodes are randomly dropped during training to alleviate issues such as overfitting and co-adaptation. In this paper, a dropout DNN-based adaptive controller is developed. The developed dropout technique allows the deactivation of weights that are stochastically selected for each individual layer within the DNN. Simultaneously, a Lyapunov-based real-time weight adaptation law is introduced to update the weights of all layers of the DNN for online unsupervised learning. A non-smooth Lyapunov-based stability analysis is performed to ensure asymptotic convergence of the tracking error. Simulation results of the developed dropout DNN-based adaptive controller indicate a 38.32% improvement in the tracking error, a 53.67% improvement in the function approximation error, and 50.44% lower control effort when compared to a baseline adaptive DNN-based controller without dropout regularization.

Yixuan Wang, Dan Guralnik, Saiedeh Akbari et al.

We introduce Effective Model Pruning (EMP), a context-agnostic, parameter-free rule addressing a fundamental question about pruning: how many entries to keep. EMP does not prescribe how to score the parameters or prune the models; instead, it supplies a universal adaptive threshold that can be applied to any pruning criterion: weight magnitude, attention score, KAN importance score, or even feature-level signals such as image pixel, and used on structural parts or weights of the models. Given any score vector s, EMP maps s to a built-in effective number N_eff which is inspired by the Inverse Simpson index of contributors. Retaining the N_eff highest scoring entries and zeroing the remainder yields sparse models with performance comparable to the original dense networks across MLPs, CNNs, Transformers/LLMs, and KAN, in our experiments. By leveraging the geometry of the simplex, we derive a tight lower bound on the preserved mass s_eff (the sum of retained scores) over the corresponding ordered probability simplex associated with the score vector s. We further verify the effectiveness of N_eff by pruning the model with a scaled threshold \b{eta}*N_eff across a variety of criteria and models. Experiments suggest that the default \b{eta} = 1 yields a robust threshold for model pruning while \b{eta} not equal to 1 still serves as an optional adjustment to meet specific sparsity requirements.