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Bibliographic Details
Main Authors: Peri, Ilaria, Wunderlich, Linus
Format: Preprint
Published: 2026
Subjects:
Online Access:https://arxiv.org/abs/2605.06220
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author Peri, Ilaria
Wunderlich, Linus
author_facet Peri, Ilaria
Wunderlich, Linus
contents Lambda quantiles, originally introduced as lambda value at risk, generalise the classical value at risk by allowing for a variable confidence level. This work presents efficient algorithms for computing lambda quantiles and demonstrates their application in portfolio optimisation. We first develop a robust algorithm, Λ-Newton-Bis, that combines Newton's method with a bisection strategy to ensure global convergence. The algorithm handles potential discontinuities and achieves local quadratic convergence under standard regularity assumptions. To address cases with multiple roots, we also propose an interval analysis approach. We then demonstrate the algorithm's computational efficiency and practical relevance within a portfolio optimization framework. To this end, we develop two alternative solution methods that incorporate the Λ-Newton-Bis procedure. Numerical experiments confirm the algorithm's convergence properties and highlight its computational advantages in optimization tasks based on lambda quantiles.
format Preprint
id arxiv_https___arxiv_org_abs_2605_06220
institution arXiv
publishDate 2026
record_format arxiv
spellingShingle Numerical methods for lambda quantiles: robust evaluation and portfolio optimisation
Peri, Ilaria
Wunderlich, Linus
Computational Finance
Risk Management
Lambda quantiles, originally introduced as lambda value at risk, generalise the classical value at risk by allowing for a variable confidence level. This work presents efficient algorithms for computing lambda quantiles and demonstrates their application in portfolio optimisation. We first develop a robust algorithm, Λ-Newton-Bis, that combines Newton's method with a bisection strategy to ensure global convergence. The algorithm handles potential discontinuities and achieves local quadratic convergence under standard regularity assumptions. To address cases with multiple roots, we also propose an interval analysis approach. We then demonstrate the algorithm's computational efficiency and practical relevance within a portfolio optimization framework. To this end, we develop two alternative solution methods that incorporate the Λ-Newton-Bis procedure. Numerical experiments confirm the algorithm's convergence properties and highlight its computational advantages in optimization tasks based on lambda quantiles.
title Numerical methods for lambda quantiles: robust evaluation and portfolio optimisation
topic Computational Finance
Risk Management
url https://arxiv.org/abs/2605.06220