2012
DOI: 10.1002/jcc.22956
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Beta‐decomposition for the volume and area of the union of three‐dimensional balls and their offsets

Abstract: Given a set of spherical balls, called atoms, in three-dimensional space, its mass properties such as the volume and the boundary area of the union of the atoms are important for many disciplines, particularly for computational chemistry/biology and structural molecular biology. Despite many previous studies, this seemingly easy problem of computing mass properties has not been well-solved. If the mass properties of the union of the offset of the atoms are to be computed as well, the problem gets even harder. … Show more

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Cited by 17 publications
(21 citation statements)
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“… and , and for a more intuitive explanation, see Ref. . To better understand the relationship between the Voronoi diagram, its quasi‐triangulation, and the beta‐complex in two‐dimensional space, readers are recommended to use the BetaConcept program available at VDRC.…”
Section: Methodsmentioning
confidence: 99%
See 1 more Smart Citation
“… and , and for a more intuitive explanation, see Ref. . To better understand the relationship between the Voronoi diagram, its quasi‐triangulation, and the beta‐complex in two‐dimensional space, readers are recommended to use the BetaConcept program available at VDRC.…”
Section: Methodsmentioning
confidence: 99%
“…The method we describe in this article uses the idea initially proposed by Kim and Sugihara with the geometrical property computation adopting the beta‐decomposition algorithm reported in Ref. . We introduce geometric modeling, a core method in Computer‐Aided Design (CAD) which deals with the unambiguous representation of shapes and algorithms to analyze and manipulate objects .…”
Section: Introductionmentioning
confidence: 99%
“…It is easy to see that the boundary of a void can be found by searching the atoms that correspond to the vertices in V C new and this property can be used in the computation of mass property. We developed a different yet more efficient and better approach called the Beta-decomposition which was reported very recently [28]. The idea of the Beta-decomposition is as follows.…”
Section: A Voidsmentioning
confidence: 99%
“…The proximity information is stored in the topology of the quasi-triangulation and thus its computation is the most important precondition for many applications running on the BetaMol such as the computation of the Connolly surface (28), (29) , the docking simulation (35), (36) , the computation of the molecular volume (37) , the computation of the molecular sphericity (38) , etc.…”
Section: Topology Structure Computation For Voronoi Diagram/quasi-trimentioning
confidence: 99%