Abstract
The calculation of the occupied and empty volume in an ensemble of overlapping spheres is not a simple task in general. There are different analytical and numerical methods, which have been developed for the treatment of specific problems, for example the calculation of local intermolecular voids or ‒ vice versa ‒ of the volume of overlapping atoms. A very efficient approach to solve these problems is based on the Voronoi-Delaunay subsimplexes, which are special triangular pyramids defined at the intersection of a Voronoi polyhedron and Delaunay simplex. The subsimplexes were proposed in a paper [1] (Sastry S.et al., Phys. Rev. E, vol.56, 5524–5532, 1997) for the calculation of the cavity volume in simple liquids. Later, the subsimplexes were applied for the treatment of the union of strongly overlapping spheres [2] (Voloshin V.P. et al., Proc. of the 8th ISVD, 170–176, 2011). In this article we discuss wider applications of subsimplexes for the calculation of the occupied and empty volumes of different structural units, selected in molecular systems. In particular, we apply them to Voronoi and Delaunay shells, defined around a solute, as well as their intersection. It opens a way to calculate the components of the partial molar volume of a macromolecule in solution, what is important for the interpretation of experimental volumetric data for protein solutions. The method is illustrated by the application to molecular dynamics models of a hIAPP polypeptide molecule in water at different temperatures.
This is a preview of subscription content, log in via an institution to check access.
Access this chapter
Tax calculation will be finalised at checkout
Purchases are for personal use only
Preview
Unable to display preview. Download preview PDF.
Similar content being viewed by others
References
Sastry, S., Corti, D.S., Debenedetti, P.G., Stillinger, F.H.: Statistical geometry of particle packings. I. Algorithm for exact determination of connectivity, volume, and surface areas of void space in monodisperse and polydisperse sphere packings. Phys. Rev. E 56(5), 5524–5532 (1997)
Voloshin, V.P., Anikeenko, A.V., Medvedev, N.N., Geiger, A.: An Algorithm for the Calculation of Volume and Surface of Unions of Spheres. Application for Solvation Shells. In: Proceedings of the 8th International Symposium on Voronoi Diagrams in Science and Engineering, ISVD 2011, pp. 170–176 (2011)
Richards, F.M.: Calculation of molecular volumes and areas for structures of known geometry. Methods Enzymol. 115, 440–464 (1985)
Connolly, M.L.: Computation of Molecular Volume. J. Am. Chem. Soc. 107, 1118–1124 (1985)
Yang, L., Guo, G.Q., Chen, L.Y., Huang, C.L., Ge, T., Chen, D., Liaw, P.K., Saksl, K., Ren, Y., Zeng, Q.S., LaQua, B., Chen, F.G., Jiang, J.Z.: Atomic-Scale Mechanisms of the Glass-Forming Ability in Metallic Glasses. Phys. Rev. Lett. 109, 105502 (2012)
Liang, J., Edelsbrunner, J.H., Fu, P., Sudhakar, P., Subramaniam, S.: Analytical shape computation of macromolecules: II. Inaccessible cavities in proteins. Proteins: Struct. Func. Genet. 33, 18–29 (1998)
Alinchenko, M.G., Anikeenko, A.V., Medvedev, N.N., Voloshin, V.P., Mezei, M., Jedlovszky, P.: Morphology of voids in molecular systems. A Voronoi-Delaunay analysis of a simulated DMPC membrane. J. Phys. Chem. B 108(49), 19056–19067 (2004)
Kim, D., Cho, C.-H., Cho, Y., Ryu, J., Bhak, J., Kim, D.-S.: Pocket extraction on proteins via the Voronoi diagram of spheres. Journal of Molecular Graphics and Modelling 26(7), 1104–1112 (2008)
Rémond, S., Gallias, J.L., Mizrahi, A.: Characterization of voids in spherical particle sys-tems by Delaunay empty spheres. Granular Matter 10, 329–334 (2008)
Kurzidim, J., Coslovich, D., Kahl, G.: Dynamic arrest of colloids in porous environments: disentangling crowding and confinement. J. Phys.: Condens. Matter 23, 234122 (2011)
Chalikian, T.V.: Volumetric Properties of Proteins. Annu. Rev. Biophys. Biomol. Struct. 32, 207–235 (2003)
Marchi, M.: Compressibility of Cavities and Biological Water from Voronoi Volumes in Hydrated Proteins. J. Phys. Chem. B 107, 6598–6602 (2003)
Mitra, L., Smolin, N., Ravindra, R., Royer, C., Winter, R.: Pressure perturbation calo-rimetric studies of the solvation properties and the thermal unfolding of proteins in solution—experiments and theoretical interpretation. Phys. Chem. Chem. Phys. 8, 1249–1265 (2006)
Brovchenko, I., Andrews, M.N., Oleinikova, A.: Volumetric properties of human islet amyloid polypeptide in liquid water. Phys. Chem. Chem. Phys. 12, 4233–4238 (2010)
Voloshin, V.P., Medvedev, N.N., Andrews, M.N., Burri, R.R., Winter, R., Geiger, A.: Volumetric Properties of Hydrated Peptides: Voronoi-Delaunay Analysis of Molecular Simulation Runs. J. Phys. Chem. B 115(48), 14217–14228 (2011)
Cazals, F., Kanhere, H., Loriot, S.: Computing the volume of a union of balls: a certified algorithm. ACM Transactions on Mathematical Software 38(1), 3 (2011)
Procacci, P., Scateni, R.: A General Algorithm for Computing Voronoi Volumes: Application to the Hydrated Crystal of Myoglobin. International Journal of Quantum Chemistry 42, 1515–1528 (1992)
Kim, A.V., Voloshin, V.P., Medvedev, N.N., Geiger, A.: Decomposition of a Protein Solution into Voronoi Shells and Delaunay Layers: Calculation of the Volumetric Properties. In: Gavrilova, M.L., Tan, C.J.K., Kalantari, B. (eds.) Transactions on Computational Science XX. LNCS, vol. 8110, pp. 56–71. Springer, Heidelberg (2013)
Voloshin, V.P., Kim, A.V., Medvedev, N.N., Winter, R., Geiger, A.: Calculation of the volumetric charateristics of macromolecules in solution by the Voronoi-Delaunay technique. J Phys. Chem. B. (submitted, 2014)
Mezei, M.: Modified proximity criteria for the analysis of the solvation of a polyfunctional solute. Molecular Simulation 1(5), 327–332 (1988)
Aurenhammer, F.: Power diagrams: properties, algorithms and applications. SIAM J. Comput. 16, 78–96 (1987)
Medvedev, N.N.: Voronoi-Delaunay method for non-crystalline structures. SB Russian Academy of Science, Novosibirsk (2000) (in Russian)
David, E.E., David, C.W.: Voronoi Polyhedra as a Tool for Studying Solvation Structure. J. Chem. Phys. 76, 4611 (1982)
Andrews, M.N., Winter, R.: Comparing the Structural Properties of Human and Rat Islet Amyloid Polypeptide by MD Computer Simulations. Biophys. Chem. 156, 43–50 (2011)
Author information
Authors and Affiliations
Editor information
Editors and Affiliations
Rights and permissions
Copyright information
© 2014 Springer-Verlag Berlin Heidelberg
About this chapter
Cite this chapter
Voloshin, V.P., Medvedev, N.N., Geiger, A. (2014). Fast Calculation of the Empty Volume in Molecular Systems by the Use of Voronoi-Delaunay Subsimplexes. In: Gavrilova, M.L., Tan, C.J.K. (eds) Transactions on Computational Science XXII. Lecture Notes in Computer Science, vol 8360. Springer, Berlin, Heidelberg. https://doi.org/10.1007/978-3-642-54212-1_8
Download citation
DOI: https://doi.org/10.1007/978-3-642-54212-1_8
Publisher Name: Springer, Berlin, Heidelberg
Print ISBN: 978-3-642-54211-4
Online ISBN: 978-3-642-54212-1
eBook Packages: Computer ScienceComputer Science (R0)