Your search keyword '"averaged hausdorff distance"' showing total 11 results

1. Multi-objective Fuzzy Reliability Redundancy Allocation for System Using Fuzzy Rank-Based Multi-objective PSO

Author

De, Satyajit, Roy, Pratik, Chowdhury, Anil Bikash, Kacprzyk, Janusz, Series Editor, Gomide, Fernando, Advisory Editor, Kaynak, Okyay, Advisory Editor, Liu, Derong, Advisory Editor, Pedrycz, Witold, Advisory Editor, Polycarpou, Marios M., Advisory Editor, Rudas, Imre J., Advisory Editor, Wang, Jun, Advisory Editor, Chaki, Rituparna, editor, Cortesi, Agostino, editor, Saeed, Khalid, editor, and Chaki, Nabendu, editor

Published

2023

2. On the Pareto Compliance of the Averaged Hausdorff Distance as a Performance Indicator

Author

Andrés Vargas

Subjects

averaged hausdorff distance, generational distance, inverted generational distance, multiobjective optimization, pareto optimality, performance indicator., Science (General), Q1-390

Abstract

The averaged Hausdorff distance ∆p is an inframetric, recently introduced in evolutionary multiobjective optimization (EMO) as a tool to measure the optimality of finite size approximations to the Pareto front associated to a multiobjective optimization problem (MOP). Tools of this kind are called performance indicators, and their quality depends on the useful criteria they provide to evaluate the suitability of different candidate solutions to a given MOP. We present here a purely theoretical study of the compliance of the ∆p -indicator to the notion of Pareto optimality. Since ∆p is defined in terms of a modified version of other well-known indicators, namely the generational distance GDp , and the inverted generational distance IGDp , specific criteria for the Pareto compliance of each one of them is discussed in detail. In doing so, we review some previously available knowledge on the behavior of these indicators, correcting inaccuracies found in the literature, and establish new and more general results, including detailed proofs and examples of illustrative situations.

Published

2018

3. On the Closest Averaged Hausdorff Archive for a Circularly Convex Pareto Front

Author

Rudolph, Günter, Schütze, Oliver, Trautmann, Heike, Hutchison, David, Series editor, Kanade, Takeo, Series editor, Kittler, Josef, Series editor, Kleinberg, Jon M., Series editor, Mattern, Friedemann, Series editor, Mitchell, John C., Series editor, Naor, Moni, Series editor, Pandu Rangan, C., Series editor, Steffen, Bernhard, Series editor, Terzopoulos, Demetri, Series editor, Tygar, Doug, Series editor, Weikum, Gerhard, Series editor, Squillero, Giovanni, editor, and Burelli, Paolo, editor

Published

2016

4. Deformation Analysis Using B-Spline Surface with Correlated Terrestrial Laser Scanner Observations—A Bridge Under Load

Author

Gaël Kermarrec, Boris Kargoll, and Hamza Alkhatib

Subjects

correlations, terrestrial laser scanning, deformation, b-splines, surface modelling, bootstrapping, matérn covariance function, hausdorff distance, averaged hausdorff distance, Science

Abstract

The choice of an appropriate metric is mandatory to perform deformation analysis between two point clouds (PC)—the distance has to be trustworthy and, simultaneously, robust against measurement noise, which may be correlated and heteroscedastic. The Hausdorff distance (HD) or its averaged derivation (AHD) are widely used to compute local distances between two PC and are implemented in nearly all commercial software. Unfortunately, they are affected by measurement noise, particularly when correlations are present. In this contribution, we focus on terrestrial laser scanner (TLS) observations and assess the impact of neglecting correlations on the distance computation when a mathematical approximation is performed. The results of the simulations are extended to real observations from a bridge under load. Highly accurate laser tracker (LT) measurements were available for this experiment: they allow the comparison of the HD and AHD between two raw PC or between their mathematical approximations regarding reference values. Based on these results, we determine which distance is better suited in the case of heteroscedastic and correlated TLS observations for local deformation analysis. Finally, we set up a novel bootstrap testing procedure for this distance when the PC are approximated with B-spline surfaces.

Published

2020

5. On the Pareto Compliance of the Averaged Hausdorff Distance as a Performance Indicator.

Author

Vargas, Andrés

Subjects

PARETO optimum, KEY performance indicators (Management), MODULES (Algebra)

Abstract

Copyright of Universitas Scientiarum is the property of Pontificia Universidad Javeriana and its content may not be copied or emailed to multiple sites or posted to a listserv without the copyright holder's express written permission. However, users may print, download, or email articles for individual use. This abstract may be abridged. No warranty is given about the accuracy of the copy. Users should refer to the original published version of the material for the full abstract. (Copyright applies to all Abstracts.)

Published

2018

6. The Averaged Hausdorff Distances in Multi-Objective Optimization: A Review

Author

Johan M. Bogoya, Andrés Vargas, and Oliver Schütze

Subjects

Averaged Hausdorff distance, evolutionary multi-objective optimization, Pareto compliance, performance indicator, power means, Mathematics, QA1-939

Abstract

A brief but comprehensive review of the averaged Hausdorff distances that have recently been introduced as quality indicators in multi-objective optimization problems (MOPs) is presented. First, we introduce all the necessary preliminaries, definitions, and known properties of these distances in order to provide a stat-of-the-art overview of their behavior from a theoretical point of view. The presentation treats separately the definitions of the ( p , q ) -distances GD p , q , IGD p , q , and Δ p , q for finite sets and their generalization for arbitrary measurable sets that covers as an important example the case of continuous sets. Among the presented results, we highlight the rigorous consideration of metric properties of these definitions, including a proof of the triangle inequality for distances between disjoint subsets when p , q ⩾ 1 , and the study of the behavior of associated indicators with respect to the notion of compliance to Pareto optimality. Illustration of these results in particular situations are also provided. Finally, we discuss a collection of examples and numerical results obtained for the discrete and continuous incarnations of these distances that allow for an evaluation of their usefulness in concrete situations and for some interesting conclusions at the end, justifying their use and further study.

Published

2019

7. A (p,q)-Averaged Hausdorff Distance for Arbitrary Measurable Sets

Author

Johan M. Bogoya, Andrés Vargas, Oliver Cuate, and Oliver Schütze

Subjects

averaged Hausdorff distance, evolutionary multi-objective optimization, power means, metric measure spaces, performance indicator, Pareto front, Applied mathematics. Quantitative methods, T57-57.97, Mathematics, QA1-939, Electronic computers. Computer science, QA75.5-76.95

Abstract

The Hausdorff distance is a widely used tool to measure the distance between different sets. For the approximation of certain objects via stochastic search algorithms this distance is, however, of limited use as it punishes single outliers. As a remedy in the context of evolutionary multi-objective optimization (EMO), the averaged Hausdorff distance Δ p has been proposed that is better suited as an indicator for the performance assessment of EMO algorithms since such methods tend to generate outliers. Later on, the two-parameter indicator Δ p , q has been proposed for finite sets as an extension to Δ p which also averages distances, but which yields some desired metric properties. In this paper, we extend Δ p , q to a continuous function between general bounded subsets of finite measure inside a metric measure space. In particular, this extension applies to bounded subsets of R k endowed with the Euclidean metric, which is the natural context for EMO applications. We show that our extension preserves the nice metric properties of the finite case, and finally provide some useful numerical examples that arise in EMO.

Published

2018

8. Sobre la sujeción de Pareto para la distancia promedio de hausdorff como indicador de desempeño

Author

Vargas, Andrés and Salcedo-Reyes, Juan Carlos

Subjects

Pareto optimality, performance indicator, distancia generacional, optimización multiobjetivo, optimalidad de Pareto, generational distance, inverted generational distance, distancia promedio de Hausdorff, distância média de Hausdorff, indicador de desempenho, multiobjective optimization, otimalidade de Pareto, distancia generacional invertida, averaged Hausdorff distance, distância geraçional invertida, indicador de desempeño, distância geraçional, otimização multiobjetivo

Abstract

The averaged Hausdorff distance Δ p is an inframetric, recently introduced in evolutionary multiobjective optimization (EMO) as a tool to measure the optimality of finite size approximations to the Pareto front associated to a multiobjective optimization problem (MOP). Tools of this kind are called performance indicators, and their quality depends on the useful criteria they provide to evaluate the suitability of different candidate solutions to a given MOP. We present here a purely theoretical study of the compliance of the Δ p -indicator to the notion of Pareto optimality. Since Δ p is defined in terms of a modified version of other well-known indicators, namely the generational distance GDp , and the inverted generational distance IGDp , specific criteria for the Pareto compliance of each one of them is discussed in detail. In doing so, we review some previously available knowledge on the behavior of these indicators, correcting inaccuracies found in the literature, and establish new and more general results, including detailed proofs and examples of illustrative situations. Resumen La distancia promedio de Hausdorff Δp es una inframétrica recientemente introducida en optimización multiobjetivo evolutiva (EMO) como una herramienta para medir la optimalidad de aproximaciones finitas al frente de Pareto asociado con un problema de optimización multiobjetivo (MOP). Presentamos aquí un estudio puramente teórico sobre la sujeción del indicador Δp a la noción de optimalidad de Pareto. Puesto que Δp está definida en términos de una versión modificada de otros indicadores bien conocidos como lo son la distancia generacional GD p y la distancia generacional invertida IGD p , discutimos en detalle criterios específicos para la sujeción de tipo Pareto de cada uno de ellos. Adicionalmente, presentamos una revisión del comportamiento previamente conocido de estos indicadores, corrigiendo imprecisiones que se encuentran en la literatura y establecemos resultados nuevos y más generales, incluyendo pruebas detalladas y ejemplos ilustrativos. Resumo A distância média de Hausdorff Δp é uma inframétrica introduzida recentemente em otimização multiobjetivo evolucionária (EMO) como uma ferramenta para medir a otimalidade de aproximações finitas para o frente de Pareto associado com um problema de optimização multiobjetivo (MOP). Apresentamos aqui um estudo puramente teórico sobre a sujeição do indicador Δp à noção de otimalidade de Pareto. Desde Δp é definido em termos de uma versão modificada de outros indicadores bem conhecidos, tais como a distância geraçional GD p ∈ a distância geraçional invertida IGD p , discutimos em detalhes critérios específicos para a sujeição de Pareto de cada um deles. Além disso, apresentamos uma revisão do comportamento previamente conhecido desses indicadores, corrigindo imprecisões encontradas na literatura ∈ estabelecemos novos ∈ mais gerais resultados, incluindo testes detalhados ∈ exemplos ilustrativos.

Published

2018

9. A (p,q)-Averaged Hausdorff Distance for Arbitrary Measurable Sets

Author

Oliver Cuate, Oliver Schütze, J. M. Bogoya, and Andrés Vargas

Subjects

metric measure spaces, performance indicator, 0211 other engineering and technologies, 02 engineering and technology, Space (mathematics), Measure (mathematics), lcsh:QA75.5-76.95, 0202 electrical engineering, electronic engineering, information engineering, power means, averaged Hausdorff distance, Finite set, Mathematics, Discrete mathematics, 021103 operations research, Continuous function, Applied Mathematics, lcsh:T57-57.97, lcsh:Mathematics, General Engineering, lcsh:QA1-939, Pareto front, Euclidean distance, Computational Mathematics, Hausdorff distance, Bounded function, evolutionary multi-objective optimization, Metric (mathematics), lcsh:Applied mathematics. Quantitative methods, 020201 artificial intelligence & image processing, lcsh:Electronic computers. Computer science

Abstract

The Hausdorff distance is a widely used tool to measure the distance between different sets. For the approximation of certain objects via stochastic search algorithms this distance is, however, of limited use as it punishes single outliers. As a remedy in the context of evolutionary multi-objective optimization (EMO), the averaged Hausdorff distance Δ p has been proposed that is better suited as an indicator for the performance assessment of EMO algorithms since such methods tend to generate outliers. Later on, the two-parameter indicator Δ p , q has been proposed for finite sets as an extension to Δ p which also averages distances, but which yields some desired metric properties. In this paper, we extend Δ p , q to a continuous function between general bounded subsets of finite measure inside a metric measure space. In particular, this extension applies to bounded subsets of R k endowed with the Euclidean metric, which is the natural context for EMO applications. We show that our extension preserves the nice metric properties of the finite case, and finally provide some useful numerical examples that arise in EMO.

Published

2018

10. Deformation Analysis Using B-Spline Surface with Correlated Terrestrial Laser Scanner Observations—A Bridge Under Load.

Author

Kermarrec, Gaël, Kargoll, Boris, and Alkhatib, Hamza

Subjects

OPTICAL scanners, NOISE measurement, REFERENCE values, POINT cloud

Abstract

The choice of an appropriate metric is mandatory to perform deformation analysis between two point clouds (PC)—the distance has to be trustworthy and, simultaneously, robust against measurement noise, which may be correlated and heteroscedastic. The Hausdorff distance (HD) or its averaged derivation (AHD) are widely used to compute local distances between two PC and are implemented in nearly all commercial software. Unfortunately, they are affected by measurement noise, particularly when correlations are present. In this contribution, we focus on terrestrial laser scanner (TLS) observations and assess the impact of neglecting correlations on the distance computation when a mathematical approximation is performed. The results of the simulations are extended to real observations from a bridge under load. Highly accurate laser tracker (LT) measurements were available for this experiment: they allow the comparison of the HD and AHD between two raw PC or between their mathematical approximations regarding reference values. Based on these results, we determine which distance is better suited in the case of heteroscedastic and correlated TLS observations for local deformation analysis. Finally, we set up a novel bootstrap testing procedure for this distance when the PC are approximated with B-spline surfaces. [ABSTRACT FROM AUTHOR]

Published

2020

11. The Averaged Hausdorff Distances in Multi-Objective Optimization: A Review.

Author

Bogoya, Johan M., Vargas, Andrés, and Schütze, Oliver

Subjects

DISTANCES, HAUSDORFF spaces, INCARNATION, GENERALIZATION, TRIANGLES

Abstract

A brief but comprehensive review of the averaged Hausdorff distances that have recently been introduced as quality indicators in multi-objective optimization problems (MOPs) is presented. First, we introduce all the necessary preliminaries, definitions, and known properties of these distances in order to provide a stat-of-the-art overview of their behavior from a theoretical point of view. The presentation treats separately the definitions of the (p , q) -distances GD p , q , IGD p , q , and Δ p , q for finite sets and their generalization for arbitrary measurable sets that covers as an important example the case of continuous sets. Among the presented results, we highlight the rigorous consideration of metric properties of these definitions, including a proof of the triangle inequality for distances between disjoint subsets when p , q ⩾ 1 , and the study of the behavior of associated indicators with respect to the notion of compliance to Pareto optimality. Illustration of these results in particular situations are also provided. Finally, we discuss a collection of examples and numerical results obtained for the discrete and continuous incarnations of these distances that allow for an evaluation of their usefulness in concrete situations and for some interesting conclusions at the end, justifying their use and further study. [ABSTRACT FROM AUTHOR]

Published

2019