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A Unified Theory of Decentralized SGD with Changing Topology and Local Updates

Anastasiia Koloskova, Nicolas Loizou, Sadra Boreiri, Martin Jaggi, Sebastian U. Stich

2020Infoscience (Ecole Polytechnique Fédérale de Lausanne)127 citationsOpen Access PDF

Abstract

Decentralized stochastic optimization methods have gained a lot of attention recently, mainly because of their cheap per iteration cost, data locality, and their communication-efficiency. In this paper we introduce a unified convergence analysis that covers a large variety of decentralized SGD methods which so far have required different intuitions, have different applications, and which have been developed separately in various communities. Our algorithmic framework covers local SGD updates and synchronous and pairwise gossip updates on adaptive network topology. We derive universal convergence rates for smooth (convex and non-convex) problems and the rates interpolate between the heterogeneous (non-identically distributed data) and iid-data settings, recovering linear convergence rates in many special cases, for instance for over-parametrized models. Our proofs rely on weak assumptions (typically improving over prior work in several aspects) and recover (and improve) the best known complexity results for a host of important scenarios, such as for instance coorperative SGD and federated averaging (local SGD).

Topics & Concepts

Computer sciencePairwise comparisonIndependent and identically distributed random variablesMathematical optimizationConvergence (economics)Mathematical proofTheoretical computer scienceGossipRate of convergenceDistributed computingTopology (electrical circuits)MathematicsRandom variableArtificial intelligenceComputer networkSocial psychologyGeometryPsychologyEconomic growthEconomicsStatisticsChannel (broadcasting)CombinatoricsStochastic Gradient Optimization TechniquesDistributed Control Multi-Agent SystemsCooperative Communication and Network Coding