Convex and Nonsmooth Optimization – Optimization Online

Bregman Regularized Proximal Point Methods for Computing Projected Solutions of Quasi-equilibrium Problems

Published: 2026/03/19

In this paper, we propose two Bregman regularized proximal point methods that provide flexibility to compute projected solutions for quasi-equilibrium problems. Each method has one Bregman projection onto the feasible set and the regularized equilibrium problem. Under standard assumptions, we prove that the methods are well-defined and that the sequences they generate converge to a … Read more

Normal cones and subdifferentials at infinity for convex analysis and optimization

Published: 2026/03/18

Thanh-Hung Pham

Convex Optimization convex analysis, Lipschitzness at infinity, optimality conditions, Subdifferentials at infinity

Motivated by recent developments, this paper further investigates normal cones and subdifferentials at infinity within the framework of convex analysis. We establish fundamental properties of these constructions and derive basic calculus rules. The obtained results extend and refine existing concepts in variational analysis and nonsmooth optimization, providing new insights into the asymptotic structure of functions … Read more

Preconditioned Proximal Gradient Methods with Conjugate Momentum: A Subspace Perspective

Published: 2026/03/16

Jian Chen

Xinmin Yang

Constrained Nonlinear Optimization, Convex Optimization, Nonsmooth Optimization composite optimization, Conjugate momentum, Preconditioned proximal gradient method, Subspace method

In this paper, we propose a descent method for composite optimization problems with linear operators. Specifically, we first design a structure-exploiting preconditioner tailored to the linear operator so that the resulting preconditioned proximal subproblem admits a closed-form solution through its dual formulation. However, such a structure-driven preconditioner may be poorly aligned with the local curvature … Read more

Strong convergence, perturbation resilience and superiorization of Generalized Modular String-Averaging with infinitely many input operators

Published: 2026/03/16

Kay Barshad

Yair Censor

Constrained Nonlinear Optimization, Convex Optimization Approximately shrinking operator, bounded perturbation resilience, bounded regularity, common fixed point problem, convex feasibility problem, dynamic string-averaging, Fej{\'e}r monotonicity, nonexpansive operators, strongly quasi-nonexpansive operators, superiorization

We study the strong convergence and bounded perturbation resilience of iterative algorithms based on the Generalized Modular String-Averaging (GMSA) procedure for infinite sequences of input operators under a general admissible control. These methods address a variety of feasibility-seeking problems in real Hilbert spaces, including the common fixed point problem and the convex feasibility problem. In … Read more

On the Complexity of Subgradient Methods for Trilevel Hierarchical Generalized Variational Inequalities

Published: 2026/03/12, Updated: 2026/03/18

Lorenzo Lampariello

Simone Sagratella

Valerio Giuseppe Sasso

Convex Optimization, Nonlinear Optimization, Nonsmooth Optimization Complexity Analysis, generalized variational inequality, hierarchical variational inequality, maximal monotone mapping, Tikhonov method

We study generalized variational inequalities with a three-level hierarchical structure. This setting extends nested GVI models beyond the bilevel case, for which $\mathcal{O}(\delta^{-4})$ complexity bounds are known for any prescribed positive tolerance $\delta$, to a fully three-level hierarchical structure. We analyze a projected averaged subgradient method combined with a Tikhonov-like regularization scheme. Under compactness, maximal … Read more

A Modified Projected Gradient Algorithm for Solving Quasiconvex Programming with Applications

Published: 2026/03/04

Pham Thi Hoai

Constrained Nonlinear Optimization, Convex Optimization, Nonlinear Optimization constrained optimization, Nonconvex programming, projected gradient method, quasiconvex programming, Supervised feature selection

In this manuscript, we introduce a novel projected gradient algorithm for solving quasiconvex optimization problems over closed convex sets. The key innovation of our new algorithm is an adaptive, parameter-free stepsize rule that requires no line search and avoids estimating constants, such as Lipschitz modulus. Unlike recent self-adaptive approach given in [17] which typically produce … Read more

Copositive and completely positive cones over symmetric cones of rank at least 5

Published: 2026/03/01

Mitsuhiro Nishijima

Convex and Nonsmooth Optimization, Linear, Cone and Semidefinite Programming Completely positive cones, Copositive cones, facial structure, Spectrahedral shadows, symmetric cones

We focus on copositive and completely positive cones over symmetric cones of rank at least $5$, and in particular investigate whether these cones are spectrahedral shadows. We extend known results for nonnegative orthants of dimension at least $5$ to general symmetric cones of rank at least $5$. Specifically, we prove that when the rank of … Read more

Lower Bounds for Linear Minimization Oracle Methods Optimizing over Strongly Convex Sets

Published: 2026/03/01

Benjamin Grimmer

nliu15

Convex Optimization complexity, frank-wolfe, Lower bound, strongly convex sets

We consider the oracle complexity of constrained convex optimization given access to a Linear Minimization Oracle (LMO) for the constraint set and a gradient oracle for the $L$-smooth, strongly convex objective. This model includes Frank-Wolfe methods and their many variants. Over the problem class of strongly convex constraint sets $S$, our main result proves that … Read more

Improved Analysis of Restarted Accelerated Gradient and Augmented Lagrangian Methods via Inexact Proximal Point Frameworks

Published: 2026/02/23

Matthew X. Burns

Jiaming Liang

Constrained Nonlinear Optimization, Convex and Nonsmooth Optimization, Convex Optimization accelerated composite gradient method, accelerated inexact proximal iteration, inexact augmented lagrangian method, inexact proximal point method, optimal iteration-complexity

This paper studies a class of double-loop (inner-outer) algorithms for convex composite optimization. For unconstrained problems, we develop a restarted accelerated composite gradient method that attains the optimal first-order complexity in both the convex and strongly convex settings. For linearly constrained problems, we introduce inexact augmented Lagrangian methods, including a basic method and an outer-accelerated … Read more

Convex analysis for composite functions without K-convexity

Published: 2026/02/13

Juan Pablo Vielma

Convex Optimization, Generalized Convexity/Monoticity

Composite functions have been studied for over 40 years and appear in a wide range of optimization problems. Convex analysis of these functions focuses on (i) conditions for convexity of the function based on properties of its components, (ii) formulas for the convex conjugate of the function based on those of its components and (iii) … Read more