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The proximal bundle algorithm (PBA) is a fundamental and computationally effective algorithm for solving optimization problems with nonsmooth components. We investigate its convergence rate, focusing on composite settings where one function is smooth and the other is piecewise linear. We interpret a sequence of null steps of the PBA as a Frank-Wolfe algorithm on the Moreau envelope of the dual problem. In light of this correspondence, we first extend the linear convergence of Kelley's method on convex piecewise linear functions from the positive homogeneous to the general case. Building on this result, we propose a novel complexity analysis of PBA and derive a $\mathcal{O}(\epsilon^{-4/5})$ iteration complexity, improving upon the best known $\mathcal{O}(\epsilon^{-2})$ guarantee. This approach also unveils new insights on bundle management.
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View The Proximal Bundle Algorithm Under a Frank-Wolfe Perspective: an Improved Complexity Analysis