Conditions for linear convergence of the gradient method for non-convex optimization

Abbaszadehpeivasti, Hadi; Klerk, Etienne de; Zamani, Moslem

doi:10.48550/arxiv.2204.00647

Cited by 3 publications

(6 citation statements)

References 18 publications

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“…Recently the authors showed that the P L inequality is necessary and sufficient conditions for the linear convergence of the gradient method with constant step lengths for L-smooth function; see [2,Theorem 5]. In what follows, we establish that the P L inequality is a necessary condition for the linear convergence of ADMM.…”

Section: Definitionmentioning

confidence: 65%

“…Deng et al [7] show that the sequence {(x k , z k , λ k )} is convergent linearly to a saddle point under the two scenarios given in Table 1. It is worth mentioning that Scenario 1 or Scenario 2 implies strong convexity of the dual objective function and therefore the P L inequality is resulted, see [2]. Hence, Theorem 6 implies the linear convergence in terms of dual value under Scenario 1 or Scenario 2.…”

Section: Definitionmentioning

confidence: 89%

“…Recently, some scholars established the linear convergence of gradient methods for L-smooth convex functions by replacing strong convexity with some mild conditions, see [2,4,30] and references therein. Inspired by these results, we prove the linear convergence of ADMM by using the so-called P L inequality.…”

Section: Definitionmentioning

confidence: 99%

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The exact worst-case convergence rate of the alternating direction method of multipliers

Abbaszadehpeivasti¹,

Klerk²,

Zamani³

2022

Preprint

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Recently, semidefinite programming performance estimation has been employed as a strong tool for the worst-case performance analysis of first order methods. In this paper, we derive new non-ergodic convergence rates for the alternating direction method of multipliers (ADMM) by using performance estimation. We give some examples which show the exactness of the given bounds. We establish that ADMM enjoys a global linear convergence rate if and only if the dual objective satisfies the Polyak-Lojasiewicz (P L) inequality in the presence of strong convexity. In addition, we give an explicit formula for the linear convergence rate factor.

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Section: Definitionmentioning

confidence: 65%

Section: Definitionmentioning

confidence: 89%

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The exact worst-case convergence rate of the alternating direction method of multipliers

Abbaszadehpeivasti¹,

Klerk²,

Zamani³

2022

Preprint

Self Cite

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“…We verify that x 1 = − 1 4 M γ and that the sequence (x t ) t cycles back to 3 4 M γ. Therefore, the sequence itself does not converge and the sequence of the PR averaged iterates converges to 1 4 M γ, while the optimum value would be 0.…”

Section: Organisation Of the Appendixmentioning

confidence: 99%

“…Therefore, many authors studied conditions in between convexity and strong convexity, aiming to obtain faster rates under relatively generic assumptions. In particular, different authors considered the restricted secant inequality [55,22], the error bound [35], Łojasiewicz-type inequalities [44], and many more [25,29,33,19,36,24,1].…”

Section: Introductionmentioning

confidence: 99%

Optimal first-order methods for convex functions with a quadratic upper bound

Baptiste¹,

Taylor²,

Dieuleveut³

2022

Preprint

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We analyze worst-case convergence guarantees of first-order optimization methods over a function class extending that of smooth and convex functions. This class contains convex functions that admit a simple quadratic upper bound. Its study is motivated by its stability under minor perturbations. We provide a thorough analysis of first-order methods, including worst-case convergence guarantees for several methods, and demonstrate that some of them achieve the optimal worstcase guarantee over the class. We support our analysis by numerical validation of worst-case guarantees using performance estimation problems. A few observations can be drawn from this analysis, particularly regarding the optimality (resp. and adaptivity) of the heavy-ball method (resp. heavy-ball with line-search). Finally, we show how our analysis can be leveraged to obtain convergence guarantees over more complex classes of functions. Overall, this study brings insights on the choice of function classes over which standard first-order methods have working worst-case guarantees.Preprint. Under review.

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Convergence rate analysis of the gradient descent-ascent method for convex-concave saddle-point problems

Zamani¹,

Abbaszadehpeivasti²,

Klerk³

2022

Preprint

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In this paper, we study the gradient descent-ascent method for convex-concave saddle-point problems. We derive a new non-asymptotic global convergence rate in terms of distance to the solution set by using the semidefinite programming performance estimation method. The given convergence rate incorporates most parameters of the problem and it is exact for a large class of strongly convex-strongly concave saddle-point problems for one iteration. We also investigate the algorithm without strong convexity and we provide some necessary and sufficient conditions under which the gradient descent-ascent enjoys linear convergence.

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Conditions for linear convergence of the gradient method for non-convex optimization

Cited by 3 publications

References 18 publications

The exact worst-case convergence rate of the alternating direction method of multipliers

The exact worst-case convergence rate of the alternating direction method of multipliers

Optimal first-order methods for convex functions with a quadratic upper bound

Convergence rate analysis of the gradient descent-ascent method for convex-concave saddle-point problems

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