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Main Authors: Paquette-Greenbaum, Simon, Yu, Jiangbo
Format: Preprint
Published: 2026
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Online Access:https://arxiv.org/abs/2601.00770
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author Paquette-Greenbaum, Simon
Yu, Jiangbo
author_facet Paquette-Greenbaum, Simon
Yu, Jiangbo
contents Investment portfolio optimization is a task conducted in all major financial institutions. The Cardinality Constrained Mean-Variance Portfolio Optimization (CCPO) problem formulation is ubiquitous for portfolio optimization. The challenge of this type of portfolio optimization, a mixed-integer quadratic programming (MIQP) problem, arises from the intractability of solutions from exact solvers, where heuristic algorithms are used to find approximate portfolio solutions. CCPO entails many laborious and complex workflows and also requires extensive effort pertaining to heuristic algorithm development, where the combination of pooled heuristic solutions results in improved efficient frontiers. Hence, common approaches are to develop many heuristic algorithms. Agentic frameworks emerge as a promising candidate for many problems within combinatorial optimization, as they have been shown to be equally efficient with regard to automating large workflows and have been shown to be excellent in terms of algorithm development, sometimes surpassing human-level performance. This study implements a novel agentic framework for the CCPO and explores several concrete architectures. In benchmark problems, the implemented agentic framework matches state-of-the-art algorithms. Furthermore, complex workflows and algorithm development efforts are alleviated, while in the worst case, lower but acceptable error is reported.
format Preprint
id arxiv_https___arxiv_org_abs_2601_00770
institution arXiv
publishDate 2026
record_format arxiv
spellingShingle LLM Agents for Combinatorial Efficient Frontiers: Investment Portfolio Optimization
Paquette-Greenbaum, Simon
Yu, Jiangbo
Computational Engineering, Finance, and Science
Artificial Intelligence
General Economics
Economics
Investment portfolio optimization is a task conducted in all major financial institutions. The Cardinality Constrained Mean-Variance Portfolio Optimization (CCPO) problem formulation is ubiquitous for portfolio optimization. The challenge of this type of portfolio optimization, a mixed-integer quadratic programming (MIQP) problem, arises from the intractability of solutions from exact solvers, where heuristic algorithms are used to find approximate portfolio solutions. CCPO entails many laborious and complex workflows and also requires extensive effort pertaining to heuristic algorithm development, where the combination of pooled heuristic solutions results in improved efficient frontiers. Hence, common approaches are to develop many heuristic algorithms. Agentic frameworks emerge as a promising candidate for many problems within combinatorial optimization, as they have been shown to be equally efficient with regard to automating large workflows and have been shown to be excellent in terms of algorithm development, sometimes surpassing human-level performance. This study implements a novel agentic framework for the CCPO and explores several concrete architectures. In benchmark problems, the implemented agentic framework matches state-of-the-art algorithms. Furthermore, complex workflows and algorithm development efforts are alleviated, while in the worst case, lower but acceptable error is reported.
title LLM Agents for Combinatorial Efficient Frontiers: Investment Portfolio Optimization
topic Computational Engineering, Finance, and Science
Artificial Intelligence
General Economics
Economics
url https://arxiv.org/abs/2601.00770