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TYPICALITY OF PERIODIC optimization OVER AN EXPANDING CIRCLE MAP

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arXiv 2025年

作者： Gao, Rui Shen, Weixiao Zhang, Ruiqin School of Mathematical Sciences Qufu Normal University Jining273165 China Shanghai Center for Mathematical Sciences New Cornerstone Science Laboratory Fudan University Jiangwan Campus No 2005 Songhu Road Shanghai200438 China School of Mathematical Sciences Fudan University No 220 Handan Road Shanghai200433 China

We study the ergodic optimization problem over a real analytic expanding circle map. We show that in both the topological and the measure-theoretical senses, a typical Cr performance function has a unique maximizing measure and the unique maximizing measure is supported on a periodic orbit, for r = 1, 2, · · ·, ∞, ω. © 2025, CC BY.

关键词： optimization algorithms

Primal-Dual algorithms for Convex optimization via Regret Minimization

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IEEE CONTROL SYSTEMS LETTERS 2018年第2期2卷 284-289页

作者： Nam Ho-Nguyen Kilinc-Karzan, Fatma Carnegie Mellon Univ Tepper Sch Business Pittsburgh PA 15213 USA

We consider a large-scale convex program with functional constraints, where interior point methods are intractable due to the problem size. The effective solution techniques for these problems permit only simple operations at each iteration, and thus are based on primal-dual first-order methods such as the Arrow-Hurwicz-Uzawa subgradient method, which utilize only gradient computations and projections at each iteration. Such primal-dual algorithms admit the interpretation of solving the associated saddle point problem arising from the Lagrange dual. We revisit these methods through the lens of regret minimization from online learning and present a flexible framework. While it is well known that two regret-minimizing algorithms can be used to solve a convex-concave saddle point problem at the standard rate of O (1/root T), our framework for primal-dual algorithms allows us to exploit structural properties such as smoothness and/or strong convexity and achieve better convergence rates in favorable cases. In particular, for non-smooth problems with strongly convex objectives, our primal-dual framework equipped with an appropriate modification of Nesterov's dual averaging algorithm achieves O (1/T) convergence rate.

关键词： optimization algorithms large-scale systems numerical algorithms

On Coupling Constraints in Pessimistic Linear Bilevel optimization

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arXiv 2025年

作者： Henke, Dorothee Lefebvre, Henri Schmidt, Martin Thürauf, Johannes University of Passau School of Business Economics and Information Systems Chair of Business Decisions and Data Science Dr.-Hans-Kapfinger-Str. 30 Passau94032 Germany Trier University Department of Mathematics Universitätsring 15 Trier54296 Germany Department Liberal Arts and Social Sciences Discrete Optimization Lab Dr.-Luise-Herzberg-Str. 4 Nuremberg90461 Germany

The literature on pessimistic bilevel optimization with coupling constraints is rather scarce and it has been common sense that these problems are harder to tackle than pessimistic bilevel problems without coupling constraints. In this note, we show that this is not the case. To this end, given a pessimistic problem with coupling constraints, we derive a pessimistic problem without coupling constraints that has the same set of globally optimal solutions. Moreover, our results also show that one can equivalently replace a pessimistic problem with such constraints with an optimistic problem without coupling constraints. This paves the way of both transferring theory and solution techniques from any type of these problems to any other *** Codes 91A65 © 2025, CC BY.

关键词： optimization algorithms

Repeat-bias-aware optimization of Beyond-accuracy Metrics for Next Basket Recommendation

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arXiv 2025年

作者： Liu, Yuanna Li, Ming Aliannejadi, Mohammad de Rijke, Maarten University of Amsterdam Netherlands

In next basket recommendation (NBR) a set of items is recommended to users based on their historical basket sequences. In many domains, the recommended baskets consist of both repeat items and explore items. Some state-of-the-art NBR methods are heavily biased to recommend repeat items so as to maximize utility. The evaluation and optimization of beyond-accuracy objectives for NBR, such as item fairness and diversity, has attracted increasing attention. How can such beyond-accuracy objectives be pursued in the presence of heavy repeat bias? We find that only optimizing diversity or item fairness without considering repeat bias may cause NBR algorithms to recommend more repeat items. To solve this problem, we propose a model-agnostic repeat-bias-aware optimization algorithm to post-process the recommended results obtained from NBR methods with the objective of mitigating repeat bias when optimizing diversity or item fairness. We consider multiple variations of our optimization algorithm to cater to multiple NBR methods. Experiments on three real-world grocery shopping datasets show that the proposed algorithms can effectively improve diversity and item fairness, and mitigate repeat bias at acceptable Recall loss. © 2025, CC BY.

关键词： optimization algorithms

Global Convergence and Rate Analysis of the Steepest Descent Method for Uncertain Multiobjective optimization via a Robust optimization Approach

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arXiv 2025年

作者： Kumar, Shubham Mahato, Nihar Kumar Ghosh, Debdas Roorkee Institute of Technology Roorkee India IIITDM Jabalpur India India

In this article, we extend our previous work (Applicable Analysis, 2024, pp. 1-25) on the steepest descent method for uncertain multiobjective optimization problems. While that study established local convergence, it did not address global convergence and the rate of convergence of the steepest descent algorithm. To bridge this gap, we provide rigorous proofs for both global convergence and the linear convergence rate of the steepest descent algorithm. Global convergence analysis strengthens the theoretical foundation of the steepest descent method for uncertain multiobjective optimization problems, offering deeper insights into its efficiency and robustness across a broader class of optimization problems. These findings enhance the method’s practical applicability and contribute to the advancement of robust optimization techniques. © 2025, CC BY-NC-ND.

关键词： optimization algorithms

How rotation invariant algorithms are fooled by noise on sparse targets 36

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How rotation invariant algorithms are fooled by noise on spa...

36th International Conference on Algorithmic Learning Theory, ALT 2025

作者： Warmuth, Manfred K. Kotlowski, Wojciech Jones, Matt Amid, Ehsan Google Inc. United States Institute of Computing Science Poznań University of Technology Poznań Poland University of Colorado BoulderCO United States

It is well known that rotation invariant algorithms are sub-optimal for learning sparse linear problems, when the number of examples is below the input dimension. This includes any gradient descent trained neural net with a fully-connected input layer initialized with a rotationally symmetric distribution. The simplest sparse problem is learning a single feature out of d features. In that case the classification error or regression loss of rotation invariant algorithms grows with 1 −n/d, where n is the number of examples seen. These lower bounds become vacuous when the number of examples n reaches the dimension d. After d examples, the gradient space has full rank and any weight vector can be expressed, including the unit vector that determines the target feature. In this work, we show that when noise is added to this sparse linear problem, rotation invariant algorithms are still sub-optimal after seeing d or more examples. We prove this via a lower bound for the Bayes optimal algorithm on a rotationally symmetrized problem. We then prove much better upper bounds on the same problem for a large variety of algorithms that are non-invariant by rotations. Finally, we analyze the gradient flow trajectories of many standard optimization algorithms (such as AdaGrad) on the same noisy feature learning problem, and show how they veer away from the noisy sparse targets. We then contrast them with a group of non-rotation invariant algorithms that veer towards the sparse targets. We believe that the lower bounds method and trajectory categorization will be crucial for analyzing other families of algorithms with different classes of invariances. © 2025 M.K. Warmuth, W. Kotlowski, M. Jones & E. Amid.

关键词： optimization algorithms

A New Dual-Population Evolutionary Algorithm Leveraging Objective-Constraint Relationships for Constrained Multi-Objective optimization

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SSRN

SSRN 2025年

作者： Ye, Jialu Tan, Chaogui Xia, Yizhang Hou, Zhanglu Liu, Yuan Zou, Juan Hunan Engineering Research Center of intelligent System Optimization and Security Key Laboratory of Intelligent Computing and Information Processing Ministry of Education Hunan National Applied Mathematics Center China Xiangtan University China

Population co-evolution strategies are widely used to handle constrained multi-objective optimization problems (CMOPs). However, existing coevolutionary algorithms oversimplify population collaboration and are rigid in evolving the auxiliary population, ignoring the importance of maintaining population diversity, especially for CMOPs with irregular feasible regions. To tackle this issue, we propose a new dual-population evolutionary algorithm, denoted as AACMO, which attempts to mine the relational features between the unconstrained Pareto front (UPF) and the constrained Pareto front (CPF) to better adapt to CMOPs with various constraints. Specifically, the method is categorized into two phases: a learning phase and an evolving phase. First, the main population (MP) aims to quickly learn the relationships between the UPF and the CPF by leveraging the advantages of different operators, namely, genetic algorithm operators and differential evolution operators, during the learning phase. Secondly, two auxiliary strategies are designed to collaborate with the MP during the evolving phase. These strategies are capable of employing a more effective co-evolution method to assist the MP in maintaining diversity, based on the degree of alignment between the learned UPF and CPF at the end of the learning phase. The effectiveness of AACMO is confirmed through comparative analysis with eight state-of-the-art algorithms across four CMOP benchmark suites. © 2025, The Authors. All rights reserved.

关键词： optimization algorithms

Optimal Scheduling Strategy for Microgrid in Service Area Based on Improved Sparrow Search Algorithm

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Optimal Scheduling Strategy for Microgrid in Service Area Ba...

International Conference of Electrical, Electronic and Networked Energy Systems, EENES 2024

作者： Xu, Xianfeng Jiang, Xinchen Wu, Jiahao Wu, Chunling Huang, Xinrong Lu, Yong College of Energy and Electrical Engineering Chang’an University Shaanxi Xi’an710064 China

ISBN: (纸本)9789819620791

It is significant to utilize renewable energy in expressway service area, establish grid-connected microgrid and manage its energy scheduling. To minimize the cost of service area microgrid, an energy optimization scheduling strategy for microgrid based on improved sparrow search algorithm(SSA) is proposed. Firstly, the load characteristics of the service area were analyzed, and the optimal scheduling model of the microgrid suitable for the service area was established. Aiming at the problems that the optimal scheduling model is difficult to solve and the traditional SSA algorithm converges too early and will fall into local optimum, the golden sine strategy and the adaptive T-distribution are introduced to improve the SSA. It can improve the optimization ability and convergence rate of the algorithm in solving the model. Taking a microgrid in a service area as an example, the results show that approach of this paper can reduce the daily operating cost by 12.5% compared with PSO, and reduce the operating cost by 7.1% compared with traditional SSA. The effectiveness of the presented method in solving the microgrid scheduling in service area is verified. © Beijing Paike Culture Commu. Co., Ltd. 2025.

关键词： optimization algorithms

Application of Nature-inspired algorithms for Optimising Photovoltaic System Energy Production 33

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Application of Nature-inspired Algorithms for Optimising Pho...

33rd Southern African Universities Power Engineering Conference, SAUPEC 2025

作者： Gwebu, Marcia Olukamni, Peter Mabunda, Nkateko University of Johannesburg Electrical and Electronic Engineeing Technology South Africa

ISBN: (纸本)9798331535162

Researchers have explored methods to maximize energy output from PV systems, with tilt and azimuth optimization being a significant area of focus. While some studies have proposed standard guidelines for tilt and azimuth based on regional differences, this project utilizes intelligent optimization algorithms to achieve optimal setting of these variables based on known mathematical model, to maximize energy production. Specifically, the study explores two nature-inspired algorithms, the Genetic Algorithm (GA) and Simulated Annealing (SA). Real-world data was obtained from South African University Radiometric Network (SAURAN) and residential PV system from Pretoria, Gauteng Province for the four seasons of the years 2023 to 2024. Performance was measured using metrics such as prediction accuracy, Standard Deviation (SD), percentage difference, Mean Absolute Error (MAE), and Mean Absolute Percentage Error (MAPE). Although both algorithms obtain tilt and azimuth settings that yield better energy production than actual production obtained from the recommended settings used in practice, the optimal settings produced by SA are more realistic (13-40°) compared to GA (30-80°). In terms of standard deviation, both algorithms exhibit high precision (low variability) across all seasons. GA exhibited a lower MAPE, indicating performance that is closer to what is already obtained in the system being studied. MAE values for both algorithms were relatively similar. Finally, sensitivity heat maps demonstrated that irradiance is more stable to variations in tilt and azimuth with SA compared to GA. Overall, this study provides valuable insights for designers and system owners, enabling them to determine the optimal tilt and azimuth angles for effective solar tracking, thereby maximizing energy output © 2025 IEEE.

关键词： optimization algorithms