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arxiv: 2601.20738 · v1 · pith:UQ6G335Hnew · submitted 2026-01-28 · 💻 cs.LG · cs.DC· eess.SP· math.OC· stat.ML

SA-PEF: Step-Ahead Partial Error Feedback for Efficient Federated Learning

classification 💻 cs.LG cs.DCeess.SPmath.OCstat.ML
keywords errorstep-aheadfeedbackpartialsa-pefalpharesidualconvergence
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Biased gradient compression with error feedback (EF) reduces communication in federated learning (FL), but under non-IID data, the residual error can decay slowly, causing gradient mismatch and stalled progress in the early rounds. We propose step-ahead partial error feedback (SA-PEF), which integrates step-ahead (SA) correction with partial error feedback (PEF). SA-PEF recovers EF when the step-ahead coefficient $\alpha=0$ and step-ahead EF (SAEF) when $\alpha=1$. For non-convex objectives and $\delta$-contractive compressors, we establish a second-moment bound and a residual recursion that guarantee convergence to stationarity under heterogeneous data and partial client participation. The resulting rates match standard non-convex Fed-SGD guarantees up to constant factors, achieving $O((\eta,\eta_0TR)^{-1})$ convergence to a variance/heterogeneity floor with a fixed inner step size. Our analysis reveals a step-ahead-controlled residual contraction $\rho_r$ that explains the observed acceleration in the early training phase. To balance SAEF's rapid warm-up with EF's long-term stability, we select $\alpha$ near its theory-predicted optimum. Experiments across diverse architectures and datasets show that SA-PEF consistently reaches target accuracy faster than EF.

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Cited by 1 Pith paper

Reviewed papers in the Pith corpus that reference this work. Sorted by Pith novelty score.

  1. A Tight Theory of Error Feedback Algorithms in Distributed Optimization

    cs.LG 2026-05 unverdicted novelty 7.0

    Provides tight convergence analyses for EF and EF21 error feedback algorithms in distributed optimization, recovering single-agent rates independently of agent count.