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THE PERCOLATION MODEL OF THE POLIMER NANOCOMPOSITE, CONTAINING FULLERENES
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References18
Kulak M.I. The fractal mechanics of materials, Graduate school, Belorussia, 2002, 304 p.
Buzmakova M.M. The percolation of the spheres in continuum, Proceedings of the Saratov University. New series. Series of mathematics, mechanics, computer science, Russia, vol. 12/issue 2, pp 48-56, 2012.
Matsumoto M. Mersenne twister: A 623-dimensionally equidistributed uniform pseudorandom number generator, ACM Trans. on Modeling and Computer Simulations, Germany, vol. 8, pp 3-30, 1998.
Hoshen J. & Kopelman R. Percolation and cluster distribution. I. Cluster multiple labeling technique and critical concentration algorithm, Physical Review B, USA, vol. 14/issue 8, pp 3438-3445, 1976.
Rubin F. The Lee path connection algorithm, IEEE Transactions on Computers , USA, vol. 23, pp 907-914, 1974.
Buzmakova M.M. Modelling of the continuum percolation of the spheres and ellipsoids, The natural sciences, Russia, vol. 41/issue 4, pp 123-133, 2012.
Dzhangurazov B.Zh. & Kozlov G. V. & Mikitaev A. K. The forecasting of the extreme characteristics of nanocomposites polymer/organoclay, Nanotech: Nanomaterials, Russia, vol. 5, pp 26-28, 2009.
Zhirikova Z.M. & Kozlov G. V. Aloev V. Z. Nanocomposite as polymer/carbon nanotubes: the forecasting of the reinforcement degree , Nanotech: Nanomaterials, Russia, vol. 33/issue 3, pp 38-41, 2012.
Dzhangurazov B.Zh. & Kozlov G. V. & Ovcharenko E.N. & Mikitaev A.K. The impact the dispersion and the interfacial adhesion on the reinforcement degree nanocomposites polymer/organoclay, The condensed matter and phase boundary , Russia, vol. 13/issue 3, pp 255-259, 2011.
Kulak M.I. The fractal mechanics of materials, Graduate school, Belorussia, 2002, 304 p.
Buzmakova M.M. The percolation of the spheres in continuum, Proceedings of the Saratov University. New series. Series of mathematics, mechanics, computer science, Russia, vol. 12/issue 2, pp 48-56, 2012.
Matsumoto M. Mersenne twister: A 623-dimensionally equidistributed uniform pseudorandom number generator, ACM Trans. on Modeling and Computer Simulations, Germany, vol. 8, pp 3-30, 1998.
Hoshen J. & Kopelman R. Percolation and cluster distribution. I. Cluster multiple labeling technique and critical concentration algorithm, Physical Review B, USA, vol. 14/issue 8, pp 3438-3445, 1976.
Rubin F. The Lee path connection algorithm, IEEE Transactions on Computers , USA, vol. 23, pp 907-914, 1974.
Buzmakova M.M. Modelling of the continuum percolation of the spheres and ellipsoids, The natural sciences, Russia, vol. 41/issue 4, pp 123-133, 2012.
Dzhangurazov B.Zh. & Kozlov G. V. & Mikitaev A. K. The forecasting of the extreme characteristics of nanocomposites polymer/organoclay, Nanotech: Nanomaterials, Russia, vol. 5, pp 26-28, 2009.
Zhirikova Z.M. & Kozlov G. V. Aloev V. Z. Nanocomposite as polymer/carbon nanotubes: the forecasting of the reinforcement degree , Nanotech: Nanomaterials, Russia, vol. 33/issue 3, pp 38-41, 2012.
Dzhangurazov B.Zh. & Kozlov G. V. & Ovcharenko E.N. & Mikitaev A.K. The impact the dispersion and the interfacial adhesion on the reinforcement degree nanocomposites polymer/organoclay, The condensed matter and phase boundary , Russia, vol. 13/issue 3, pp 255-259, 2011.
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