Optimización robusta de portafolios: conjuntos de incertidumbre y contrapartes robustas

Carlos Andrés  Zapata Quimbayo

doi:10.18601/17941113.n20.04

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Zapata Quimbayo, C.A. 2022. Optimización robusta de portafolios: conjuntos de incertidumbre y contrapartes robustas . ODEON. 20 (jun. 2022), 93–121. DOI:https://doi.org/10.18601/17941113.n20.04.

Publicado: Nov 1, 2022

Actualizado: 2022-11-01

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2022-11-01 (2)

2022-06-07 (1)

Doi

https://doi.org/10.18601/17941113.n20.04

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PlumX

Número

Núm. 20 (2021): Enero-Junio

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Artículos

Términos de Licencia

Esta obra está bajo una licencia internacional Creative Commons Atribución-NoComercial-CompartirIgual 4.0.

Carlos Andrés Zapata Quimbayo

https://orcid.org/0000-0003-3337-0182

Resumen

Los modelos de optimización robusta (OR) han permitido superar las limitaciones del modelo media-varianza (MV), que comprende el enfoque tradicional para la selección de portafolios óptimos de inversión, al incorporar la incertidumbre de los parámetros del modelo (retornos esperados y covarianzas). En este trabajo se presentan los desarrollos de la OR en la teoría de portafolio mediante el enfoque del peor de los casos, a partir del cual se incorporan las formulaciones robustas para el modelo MV, teniendo en cuenta los trabajos de Markowitz y Sharpe. A partir de estas formulaciones, se lleva a cabo una sencilla aplicación en la que se resaltan las ventajas y bondades de las contrapartes robustas frente al modelo MV original. Al final, se presenta una breve discusión de formulaciones adicionales en materia de conjuntos de incertidumbre y otras medidas de desempeño.

Palabras clave:

portafolio óptimo;

optimización robusta;

conjuntos de incertidumbre

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