DS FedProxGrad: Asymptotic Stationarity Without Noise Floor in Fair Federated Learning
Abstract
Recent work arifgroup introduced Federated Proximal Gradient (FedProxGrad) for solving non-convex composite optimization problems in group fair federated learning. However, the original analysis established convergence only to a noise-dominated neighborhood of stationarity, with explicit dependence on a variance-induced noise floor. In this work, we provide an improved asymptotic convergence analysis for a generalized FedProxGrad-type analytical framework with inexact local proximal solutions and explicit fairness regularization. We call this extended analytical framework DS FedProxGrad (Decay Step Size FedProxGrad). Under a Robbins-Monro step-size schedule robbins1951stochastic and a mild decay condition on local inexactness, we prove that r∞ E[\|∇ F(xr)\|2] = 0, i.e., the algorithm is asymptotically stationary and the convergence rate does not depend on a variance-induced noise floor.
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