Global continuation for distance geometry problems | Zendy

Jorge J. Morè | Zendy; Zhijun Wu | Zendy

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Global continuation for distance geometry problems

Author(s) -

Jorge J. Morè,

Zhijun Wu

Publication year - 1995

Publication title -

osti oai (u.s. department of energy office of scientific and technical information)

Language(s) - English

Resource type - Reports

DOI - 10.2172/510547

Subject(s) - continuation , smoothing , geometry , minification , energy minimization , mathematics , interpretation (philosophy) , computer science , mathematical optimization , algorithm , statistics , physics , quantum mechanics , programming language

Distance geometry problems arise in the interpretation of NMR data and in the determination of protein structure. The authors formulate the distance geometry problem as a global minimization problem with special structure, and show the global smoothing techniques and a continuation approach for global optimization can be used to determine solutions of distance geometry problems with a nearly 100% probability of success

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