Combinatoric analysis of heterogeneous stochastic self-assembly.

We analyze a fully stochastic model of heterogeneous nucleation and self-assembly in a closed system with a fixed total particle number M, and a fixed number of seeds Ns. Each seed can bind a maximum of N particles. A discrete master equation for the probability distribution of the cluster sizes is derived and the corresponding cluster concentrations are found using kinetic Monte-Carlo simulations in terms of the density of seeds, the total mass, and the maximum cluster size. In the limit of slow detachment, we also find new analytic expressions and recursion relations for the cluster densities at intermediate times and at equilibrium. Our analytic and numerical findings are compared with those obtained from classical mass-action equations and the discrepancies between the two approaches analyzed.

[1]  Charalambos A. Charalambides,et al.  Enumerative combinatorics , 2018, SIGA.

[2]  T. Chou,et al.  First passage times in homogeneous nucleation and self-assembly. , 2012, The Journal of chemical physics.

[3]  A. Berezhkovskii,et al.  Stochastic model of clathrin-coated pit assembly. , 2012, Biophysical journal.

[4]  T. Chou,et al.  Stochastic self-assembly of incommensurate clusters. , 2011, The Journal of chemical physics.

[5]  T. Chou,et al.  Coarsening and accelerated equilibration in mass-conserving heterogeneous nucleation. , 2011, Physical review. E, Statistical, nonlinear, and soft matter physics.

[6]  S. Bhattacharjee,et al.  Adsorption of an antimicrobial peptide on self-assembled monolayers by molecular dynamics simulation. , 2010, The journal of physical chemistry. B.

[7]  M. Platt,et al.  Sickle cell biomechanics. , 2010, Annual review of biomedical engineering.

[8]  Iain G. Johnston,et al.  Modelling the self-assembly of virus capsids , 2009, Journal of physics. Condensed matter : an Institute of Physics journal.

[9]  M. McCready,et al.  Comparison of heterogeneous and homogeneous bubble nucleation using molecular simulations , 2007 .

[10]  P. Rothemund Folding DNA to create nanoscale shapes and patterns , 2006, Nature.

[11]  N. Chayen,et al.  Experiment and theory for heterogeneous nucleation of protein crystals in a porous medium. , 2006, Proceedings of the National Academy of Sciences of the United States of America.

[12]  C. Rischel,et al.  The kinetic behavior of insulin fibrillation is determined by heterogeneous nucleation pathways , 2005, Protein science : a publication of the Protein Society.

[13]  Tom Chou,et al.  INSTITUTE OF PHYSICS PUBLISHING JOURNAL OF PHYSICS A: MATHEMATICAL AND GENERAL , 2000 .

[14]  J. Trojanowski,et al.  “Fatal Attractions” of Proteins: A Comprehensive Hypothetical Mechanism Underlying Alzheimer's Disease and Other Neurodegenerative Disorders , 2000, Annals of the New York Academy of Sciences.

[15]  F. Brodsky,et al.  Complete Reconstitution of Clathrin Basket Formation with Recombinant Protein Fragments: Adaptor Control of Clathrin Self‐Assembly , 2000, Traffic.

[16]  M. Barkley,et al.  Self-assembly of designed antimicrobial peptides in solution and micelles. , 1997, Biochemistry.

[17]  A. Zlotnick,et al.  To build a virus capsid. An equilibrium model of the self assembly of polyhedral protein complexes. , 1994, Journal of molecular biology.

[18]  C. Walsh,et al.  Enzymatic Reaction Mechanisms , 1978 .

[19]  P. Germain,et al.  Nucleation in Condensed Matter , 1983 .