Location and portfolio selection problems: A unified framework

Andrea Scozzari; Justo Puerto; Moises Rodr\'iguez-Madrena

arxiv: 1907.07101 · v1 · pith:SH3B3HUVnew · submitted 2019-07-15 · 💱 q-fin.PM

Location and portfolio selection problems: A unified framework

Justo Puerto , Moises Rodr\'iguez-Madrena , Andrea Scozzari This is my paper

Pith reviewed 2026-05-24 21:20 UTC · model grok-4.3

classification 💱 q-fin.PM

keywords portfolio selectionlocation problemsmixed-integer linear programmingclusteringassets networkcorrelation metricunified optimization

0 comments

The pith

A mixed-integer linear program solves asset clustering and portfolio selection together instead of in separate steps.

A machine-rendered reading of the paper's core claim, the machinery that carries it, and where it could break.

The paper proposes combining classical location problems on networks with portfolio optimization into a single optimization model. By using correlation coefficients to define distances between assets, the model treats clustering as an additional criterion in the portfolio problem. This unified approach avoids the common two-step process of first clustering assets and then selecting the portfolio. A mixed-integer linear programming formulation makes this possible, and preliminary tests on real financial data show its effectiveness. If correct, this means investors can optimize for both return-risk and clustering effects in one computation.

Core claim

The paper shows that by endowing the assets network with a correlation-based metric and adding a classical location problem objective as a new criterion to the portfolio selection problem, a mixed-integer linear programming formulation can handle the combined clustering and selection in a unified phase.

What carries the argument

A mixed-integer linear programming formulation that integrates an objective function from a classical location problem into the mean-risk portfolio optimization model.

If this is right

The model measures the effect of clustering on selected assets versus non-selected ones directly.
It allows solving the portfolio problem while accounting for network clustering in one optimization run.
Preliminary computational experiments on real datasets validate its effectiveness.
This approach can be applied to mean-risk bi-criteria optimization with clustering.

Where Pith is reading between the lines

These are editorial extensions of the paper, not claims the author makes directly.

This could lead to more stable portfolios by considering asset clusters implicitly.
Extensions might include other location problems like p-median or facility location variants.
It suggests that correlation networks can serve as a basis for joint financial and spatial optimization problems.

Load-bearing premise

The assumption that adding a location problem objective function as a criterion meaningfully captures the clustering effect on selected assets relative to non-selected ones, using correlation as distance.

What would settle it

If running the unified MILP on a dataset where clustering is known to matter shows no improvement in out-of-sample performance compared to separate clustering then selection, the unified benefit would be refuted.

read the original abstract

Given a set of assets and an investment capital, the classical portfolio selection problem consists in determining the amount of capital to be invested in each asset in order to build the most profitable portfolio. The portfolio optimization problem is naturally modeled as a mean-risk bi-criteria optimization problem where the mean rate of return of the portfolio must be maximized whereas a given risk measure must be minimized. Several mathematical programming models and techniques have been presented in the literature in order to efficiently solve the portfolio problem. A relatively recent promising line of research is to exploit clustering information of an assets network in order to develop new portfolio optimization paradigms. In this paper we endow the assets network with a metric based on correlation coefficients between assets' returns, and show how classical location problems on networks can be used for clustering assets. In particular, by adding a new criterion to the portfolio selection problem based on an objective function of a classical location problem, we are able to measure the effect of clustering on the selected assets with respect to the non-selected ones. Most papers dealing with clustering and portfolio selection models solve these problems in two distinct steps: cluster first and then selection. The innovative contribution of this paper is that we propose a Mixed-Integer Linear Programming formulation for dealing with this problem in a unified phase. The effectiveness of our approach is validated reporting some preliminary computational experiments on some real financial dataset.

Editorial analysis

A structured set of objections, weighed in public.

Desk editor's note, referee report, simulated authors' rebuttal, and a circularity audit. Tearing a paper down is the easy half of reading it; the pith above is the substance, this is the friction.

Desk Editor's Note private letter to a colleague

The paper folds a location-problem objective on a correlation network into a mean-risk MILP so clustering and asset selection run in one phase rather than two.

read the letter

The core contribution is a MILP that adds a classical location objective to the standard mean-risk portfolio model. Assets sit on a network whose distances come from return correlations, and the location term penalizes or rewards how the selected assets sit relative to the non-selected ones. This replaces the usual cluster-first-then-optimize sequence with a single optimization pass. The formulation is straightforward to write down and the authors report that it solves on real market data without obvious blow-ups in size or time. That is the concrete advance over the two-step papers they cite. The modeling step itself is clean and the claim of unification holds up internally. The main limitation is that the location objective is presented as a natural way to capture clustering effects, yet the paper gives little evidence that this particular term improves out-of-sample risk or return beyond what a separate clustering step already delivers. The experiments are labeled preliminary and supply no statistical comparison or out-of-sample test that would show the unified run is worth the extra modeling effort. Correlation is a defensible distance, but readers will still want to see why this metric plus this location function is the right one for portfolio purposes. The work is aimed at researchers who already combine network methods with portfolio optimization and who are comfortable with MILP. It is a modest but coherent modeling step rather than a breakthrough. A serious editor should send it to referees because the construction is consistent and the idea is a direct extension of existing lines; the referees can then judge whether the practical payoff justifies the added complexity.

Referee Report

2 major / 2 minor

Summary. The paper proposes a mixed-integer linear programming (MILP) formulation that unifies mean-risk portfolio optimization with a classical location problem objective defined on an assets network whose edges are weighted by a correlation-based metric; this allows simultaneous asset clustering and portfolio selection in a single optimization phase rather than the conventional two-step cluster-then-select procedure, with preliminary computational results reported on real financial datasets.

Significance. If the MILP correctly encodes the location objective without distorting the mean-risk trade-off and if the experiments demonstrate advantages over sequential methods, the unified model would provide a computationally attractive way to incorporate network clustering directly into portfolio decisions, extending the literature on correlation-based asset networks.

major comments (2)

[Formulation section (around the definition of the combined objective)] The central modeling claim rests on the assertion that adding a location-problem objective 'measures the effect of clustering on the selected assets with respect to the non-selected ones'; however, the manuscript provides no derivation or numerical check showing that this term remains meaningful once the mean-risk objectives are active (e.g., it may be dominated or become redundant).
[Computational experiments section] The abstract states that 'preliminary computational experiments on real financial datasets validate the approach,' yet the reported results contain no comparison against a two-phase baseline, no out-of-sample performance metrics, and no statistical tests; without these the effectiveness claim cannot be assessed.

minor comments (2)

[Network construction paragraph] Notation for the correlation-derived distance should be introduced once and used consistently; currently the transition from correlation matrix to network metric is described only informally.
[Introduction and model section] The manuscript should cite the specific location problems (p-median, p-center, etc.) whose objective functions are being adapted, rather than referring generically to 'classical location problems on networks.'

Simulated Author's Rebuttal

2 responses · 0 unresolved

We thank the referee for the constructive comments on our manuscript. We address each major comment below and indicate the revisions we will make.

read point-by-point responses

Referee: [Formulation section (around the definition of the combined objective)] The central modeling claim rests on the assertion that adding a location-problem objective 'measures the effect of clustering on the selected assets with respect to the non-selected ones'; however, the manuscript provides no derivation or numerical check showing that this term remains meaningful once the mean-risk objectives are active (e.g., it may be dominated or become redundant).

Authors: We agree that the current manuscript does not include a formal derivation or numerical verification of the location term's contribution when the mean-risk objectives are simultaneously active. In the revised version we will add an analysis of the combined objective, including a decomposition showing the scaling and interaction of terms, together with small-scale numerical examples that isolate the effect of the location component. revision: yes
Referee: [Computational experiments section] The abstract states that 'preliminary computational experiments on real financial datasets validate the approach,' yet the reported results contain no comparison against a two-phase baseline, no out-of-sample performance metrics, and no statistical tests; without these the effectiveness claim cannot be assessed.

Authors: The experiments reported are preliminary and focus on demonstrating computational feasibility of the unified MILP. We acknowledge the absence of direct two-phase baselines, out-of-sample metrics, and statistical tests. The revised manuscript will expand this section to include comparisons against a standard cluster-then-select procedure, out-of-sample evaluation, and statistical significance tests on the performance differences. revision: yes

Circularity Check

0 steps flagged

No significant circularity

full rationale

The paper's core contribution is the construction of a new MILP model that augments a standard mean-risk portfolio objective with an additional location-problem term on a correlation network; this is presented as a modeling unification solved in one phase rather than two. No derivation chain, parameter fitting, or uniqueness claim is described that reduces by construction to prior fitted values or self-citations. The approach is self-contained as an optimization formulation whose validity rests on the explicit MILP constraints and objective, not on any recursive definition or imported ansatz.

Axiom & Free-Parameter Ledger

0 free parameters · 0 axioms · 0 invented entities

Abstract-only review yields no explicit free parameters, axioms, or invented entities; the correlation metric and location objective are treated as standard inputs from prior literature.

pith-pipeline@v0.9.0 · 5774 in / 1008 out tokens · 21763 ms · 2026-05-24T21:20:33.006621+00:00 · methodology

discussion (0)

Reference graph

Works this paper leans on

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[1] [1]

M., Heath, D.: Coheren t Measures of Risk

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Bellini, F., Di Bernardino, E.: Risk management with exp ectiles. The European Journal of Finance 23, 487–506 (2017)

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Computers & Operations Research 35, 766–775 (2008)

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[4] [4]

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Benati, S., García, S.: A mixed integer linear model for c lustering with variable selection. Comput- ers & Operations Research 43, 280–285 (2014)

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Journal of the Operationa l Research Society 69, 1379–1395 (2018)

Benati, S., García, S., Puerto, J.: Mixed integer linear programming and heuristic methods for feature selection in clustering. Journal of the Operationa l Research Society 69, 1379–1395 (2018)

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T OP 22, 934–949 (2014)

Beraldi, P ., Bruni, M.E.: A clustering approach for scen ario tree reduction: an application to a stochastic programming portfolio optimization problem. T OP 22, 934–949 (2014)

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Boginski, V ., Butenko, S., Shirokikh, O., Trukhanov, S., Lafuente, J.G.: A network-based data min- ing approach to portfolio selection via weighted clique rel axations. Annals of Operations Research 216, 23–34 (2014)

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work page 2017

[12] [12]

qu adratic portfolio selection models with hard real world constraints

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Computers & Operations Research 27, 1271–1302 (2000)

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K., Ziemba, W

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P ., Grassi, R., Hitaj, A.: Asset allocatio n: new evidence through network approaches

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