Introduces inexactly smooth convex functions with interpolation theorems for PEP-based analysis and derives new optimal gradient methods for Hölder smooth convex minimization.
Universal and Parameter-free Gradient Sliding for Composite Optimization
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abstract
We propose a Parameter-Free Universal Gradient Sliding (PFUGS) algorithm for computing an approximate solution to the convex composite optimization $\min_{x\in X} \{f(x) + g(x)\}$, where $f$ has $(M_\nu,\nu)$-H\"older continuous subgradient and $g$ has $L$-Lipschitz continuous gradient. PFUGS computes an $\varepsilon$-approximate solution with $\mathcal{O}((M_\nu/\varepsilon)^{{2}/{(1+3\nu)}})$ evaluations of (sub)gradients of $f$ and $\mathcal{O}((L/\varepsilon)^{1/2})$ evaluations of gradients of $g$, without prior knowledge of problem constants. To the best of our knowledge, PFUGS is the first gradient sliding algorithm for problems involving two functions whose distinct problem constants are both unknown a priori.
fields
math.OC 1years
2026 1verdicts
UNVERDICTED 1representative citing papers
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Inexactly Smooth Performance Estimation and New Optimized Gradient Methods
Introduces inexactly smooth convex functions with interpolation theorems for PEP-based analysis and derives new optimal gradient methods for Hölder smooth convex minimization.