Phase transitions of a single polymer chain: A Wang-Landau simulation study.
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[1] An off-lattice Wang-Landau study of the coil-globule and melting transitions of a flexible homopolymer. , 2006, The Journal of chemical physics.
[2] M. Taylor. Collapse transition of isolated Lennard-Jones chain molecules: Exact results for short chains , 2001 .
[3] Zhou,et al. First-Order Disorder-to-Order Transition in an Isolated Homopolymer Model. , 1996, Physical review letters.
[4] Kurt Binder,et al. All-or-none proteinlike folding transition of a flexible homopolymer chain. , 2009, Physical review. E, Statistical, nonlinear, and soft matter physics.
[5] D. Pagan,et al. Phase behavior of short-range square-well model. , 2004, The Journal of chemical physics.
[6] Frenkel,et al. Isostructural solid-solid transition in crystalline systems with short-ranged interaction. , 1994, Physical review. E, Statistical physics, plasmas, fluids, and related interdisciplinary topics.
[7] Thomas Neuhaus,et al. 2D Crystal Shapes, Droplet Condensation, and Exponential Slowing Down in Simulations of First-Order Phase Transitions , 2002 .
[8] A Mitsutake,et al. Generalized-ensemble algorithms for molecular simulations of biopolymers. , 2000, Biopolymers.
[9] W. Paul,et al. Phase transitions in a single polymer chain: A micro-canonical analysis of Wang-Landau simulations , 2008, Comput. Phys. Commun..
[10] C. Hall,et al. Polymer-induced phase separations in nonaqueous colloidal suspensions , 1983 .
[11] Toyoichi Tanaka,et al. First observation of the coil–globule transition in a single polymer chain , 1979, Nature.
[12] W. Stockmayer. Problems of the statistical thermodynamics of dilute polymer solutions , 1960 .
[13] Haojun Liang,et al. First-order transition of a homopolymer chain with Lennard-Jones potential , 2000 .
[14] M. Taylor. Collapse transition for isolated square-well chain molecules: The exact density of states for short chains , 2003 .
[15] Globule transitions of a single homopolymer: a Wang-Landau Monte Carlo study. , 2006, Physical review. E, Statistical, nonlinear, and soft matter physics.
[16] Wolfhard Janke,et al. Microcanonical analyses of peptide aggregation processes. , 2006, Physical review letters.
[17] J Hernández-Rojas,et al. Microcanonical versus canonical analysis of protein folding. , 2008, Physical review letters.
[18] Thomas Wüst,et al. Versatile approach to access the low temperature thermodynamics of lattice polymers and proteins. , 2009, Physical review letters.
[19] Juan J. de Pablo,et al. Extended continuum configurational bias Monte Carlo methods for simulation of flexible molecules , 1995 .
[20] Kurt Binder,et al. Recent Developments in Monte Carlo Simulations of Lattice Models for Polymer Systems , 2008 .
[21] P. Tarazona,et al. Low melting temperature and liquid surface layering for pair potential models , 2002 .
[22] Daan Frenkel,et al. Determination of phase diagrams for the hard-core attractive Yukawa system , 1994 .
[23] S. Garde,et al. Direct determination of phase behavior of square-well fluids. , 2005, The Journal of chemical physics.
[24] M. Karplus,et al. Equilibrium thermodynamics of homopolymers and clusters: Molecular dynamics and Monte Carlo simulations of systems with square-well interactions , 1997 .
[25] K. Binder,et al. Unexpectedly normal phase behavior of single homopolymer chains. , 2007, Physical review. E, Statistical, nonlinear, and soft matter physics.
[26] P. Flory. Principles of polymer chemistry , 1953 .
[27] K. Binder,et al. The phase diagram of a single polymer chain: New insights from a new simulation method , 2006 .
[28] David J. Earl,et al. Monte Carlo simulations. , 2008, Methods in molecular biology.
[29] J. Luettmer-Strathmann,et al. Dynamics of a single polymer chain: ergodicity and conformation of a rotating chain. , 2008, Physical review. E, Statistical, nonlinear, and soft matter physics.
[30] D. Landau,et al. Determining the density of states for classical statistical models: a random walk algorithm to produce a flat histogram. , 2001, Physical review. E, Statistical, nonlinear, and soft matter physics.
[31] Kurt Binder,et al. On the first-order collapse transition of a three-dimensional, flexible homopolymer chain model , 2005 .
[32] J. Doye,et al. Collapse of Lennard-Jones homopolymers: Size effects and energy landscapes , 2002 .
[33] Kurt Binder,et al. Transitions of tethered polymer chains: a simulation study with the bond fluctuation lattice model. , 2008, The Journal of chemical physics.
[34] Shao-Tang Sun,et al. Coil-Globule Phase Transition in a Single Polystyrene Chain in Cyclohexane , 1980 .
[35] H. Stanley,et al. Statistical physics of macromolecules , 1995 .
[36] D. Landau,et al. A new approach to Monte Carlo simulations in statistical physics: Wang-Landau sampling , 2004 .
[37] D. Landau,et al. Efficient, multiple-range random walk algorithm to calculate the density of states. , 2000, Physical review letters.
[38] B. Alder,et al. Studies in molecular dynamics. XVIII. The square-well phase diagram , 1980 .
[39] D. Landau,et al. Wang-Landau algorithm for continuous models and joint density of states. , 2005, Physical review letters.
[40] Kurt Binder,et al. Monte Carlo Simulations in Statistical Physics , 2009, Encyclopedia of Complexity and Systems Science.
[41] D. Landau,et al. Developments in Wang-Landau Simulations of a Simple Continuous Homopolymer , 2008 .