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On the Convergence Analysis of Asynchronous SGD for Solving Consistent Linear Systems

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arxiv 2004.02163 v1 pith:LQEGYDUV submitted 2020-04-05 math.OC cs.CCcs.DCcs.NAmath.NA

On the Convergence Analysis of Asynchronous SGD for Solving Consistent Linear Systems

classification math.OC cs.CCcs.DCcs.NAmath.NA
keywords asynchronousconvergencelinearparallelnumbersynchronousalgorithmbetter
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In the realm of big data and machine learning, data-parallel, distributed stochastic algorithms have drawn significant attention in the present days.~While the synchronous versions of these algorithms are well understood in terms of their convergence, the convergence analyses of their asynchronous counterparts are not widely studied. In this paper, we propose and analyze a {\it distributed, asynchronous parallel} SGD in light of solving an arbitrary consistent linear system by reformulating the system into a stochastic optimization problem as studied by Richt\'{a}rik and Tak\'{a}\~{c} in [35]. We compare the convergence rates of our asynchronous SGD algorithm with the synchronous parallel algorithm proposed by Richt\'{a}rik and Tak\'{a}\v{c} in [35] under different choices of the hyperparameters---the stepsize, the damping factor, the number of processors, and the delay factor. We show that our asynchronous parallel SGD algorithm also enjoys a global linear convergence rate, similar to the {\em basic} method and the synchronous parallel method in [35] for solving any arbitrary consistent linear system via stochastic reformulation. We also show that our asynchronous parallel SGD improves upon the {\em basic} method with a better convergence rate when the number of processors is larger than four. We further show that this asynchronous approach performs asymptotically better than its synchronous counterpart for certain linear systems. Moreover, for certain linear systems, we compute the minimum number of processors required for which our asynchronous parallel SGD is better, and find that this number can be as low as two for some ill-conditioned problems.

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