Double variable neighbourhood search with smoothing for the molecular distance geometry problem

Leo Liberti; Carlile Lavor; Nelson MacUlan; Fabrizio Marinelli

doi:10.1007/s10898-007-9218-1

Double variable neighbourhood search with smoothing for the molecular distance geometry problem

Leo Liberti
, Carlile Lavor
, Nelson MacUlan
, Fabrizio Marinelli

Research output: Contribution to journal › Article › peer-review

Abstract

We discuss the geometrical interpretation of a well-known smoothing operator applied to the Molecular Distance Geometry Problem (MDGP), and we then describe a heuristic approach based on Variable Neighbourhood Search on the smoothed and original problem. This algorithm often manages to find solutions having higher accuracy than other methods. This is important as small differences in the objective function value may point to completely different 3D molecular structures.

Original language	English
Pages (from-to)	207-218
Number of pages	12
Journal	Journal of Global Optimization
Volume	43
Issue number	2-3
DOIs	https://doi.org/10.1007/s10898-007-9218-1
Publication status	Published - 1 Jan 2009

Keywords

Distance geometry
Global continuation
Global optimization
Molecular conformation
Smoothing
Variable neighbourhood search

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10.1007/s10898-007-9218-1

Cite this

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title = "Double variable neighbourhood search with smoothing for the molecular distance geometry problem",

abstract = "We discuss the geometrical interpretation of a well-known smoothing operator applied to the Molecular Distance Geometry Problem (MDGP), and we then describe a heuristic approach based on Variable Neighbourhood Search on the smoothed and original problem. This algorithm often manages to find solutions having higher accuracy than other methods. This is important as small differences in the objective function value may point to completely different 3D molecular structures.",

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AU - Lavor, Carlile

AU - MacUlan, Nelson

AU - Marinelli, Fabrizio

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N2 - We discuss the geometrical interpretation of a well-known smoothing operator applied to the Molecular Distance Geometry Problem (MDGP), and we then describe a heuristic approach based on Variable Neighbourhood Search on the smoothed and original problem. This algorithm often manages to find solutions having higher accuracy than other methods. This is important as small differences in the objective function value may point to completely different 3D molecular structures.

AB - We discuss the geometrical interpretation of a well-known smoothing operator applied to the Molecular Distance Geometry Problem (MDGP), and we then describe a heuristic approach based on Variable Neighbourhood Search on the smoothed and original problem. This algorithm often manages to find solutions having higher accuracy than other methods. This is important as small differences in the objective function value may point to completely different 3D molecular structures.

KW - Distance geometry

KW - Global continuation

KW - Global optimization

KW - Molecular conformation

KW - Smoothing

KW - Variable neighbourhood search

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DO - 10.1007/s10898-007-9218-1

M3 - Article

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EP - 218

JO - Journal of Global Optimization

JF - Journal of Global Optimization

IS - 2-3

ER -

Double variable neighbourhood search with smoothing for the molecular distance geometry problem

Abstract

Keywords

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