Crystallization of Flexible Chains of Tangent Hard Spheres under Full Confinement

Ramos, Pablo; Herranz, Miguel; Martínez-Fernández, Daniel; Foteinopoulou, Katerina; Laso, Manuel; Karayiannis, Nikos Ch.

doi:10.1021/acs.jpcb.2c03424

Cited by 13 publications

(18 citation statements)

References 103 publications

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“…In spite of these difficulties, a wide variety of increasingly more efficient MC methods have been developed over the last few decades [ 78 , 79 , 82 , 83 , 84 , 85 , 86 , 87 , 88 ]. The work to be reported in this manuscript is based on a powerful suite of advanced MC moves [ 89 ], which in the past has enabled us to observe the entropy-driven athermal polymer crystallization for the first time [ 71 ], and to identify and analyze the factors that affect the phenomenon, including chain length and its distribution [ 71 , 90 ], the presence of bond gaps or tangency [ 91 ], and confinement in one [ 92 ] or all three [ 93 ] dimensions.…”

Section: Introductionmentioning

confidence: 99%

Polymorphism and Perfection in Crystallization of Hard Sphere Polymers

et al. 2022

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We present results on polymorphism and perfection, as observed in the spontaneous crystallization of freely jointed polymers of hard spheres, obtained in an unprecedentedly long Monte Carlo (MC) simulation on a system of 54 chains of 1000 monomers. Starting from a purely amorphous configuration, after an initial dominance of the hexagonal closed packed (HCP) polymorph and a transitory random hexagonal close packed (rHCP) morphology, the system crystallizes in a final, stable, face centered cubic (FCC) crystal of very high perfection. An analysis of chain conformational characteristics, of the spatial distribution of monomers and of the volume accessible to them shows that the phase transition is caused by an increase in translational entropy that is larger than the loss of conformational entropy of the chains in the crystal, compared to the amorphous state. In spite of the significant local re-arrangements, as reflected in the bending and torsion angle distributions, the average chain size remains unaltered during crystallization. Polymers in the crystal adopt ideal random walk statistics as their great length renders local conformational details, imposed by the geometry of the FCC crystal, irrelevant.

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Section: Introductionmentioning

confidence: 99%

Polymorphism and Perfection in Crystallization of Hard Sphere Polymers

et al. 2022

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“…Site i is identified as an X-type crystal when the calculated CCE norm is lower than a critical threshold, ≤ . In past studies, an empirical threshold of 0.245 was determined for packings of non-overlapping spheres [41,95,96] in the bulk [40][41][42][43]55,56] and under confinement [44,45]. Due to the strict concept behind the descriptor, the CCE norm is highly discriminatory, so the value of a site cannot be simultaneously very low for two different reference crystals.…”

Section: Local Order: Characteristic Crystallographic Element Normmentioning

confidence: 99%

“…The mechanism of crystallization of hard colloidal polymers [37][38][39][40][41][42][43][44][45] differs substantially from that of traditional polymers, the latter as revealed in x-ray scattering studies of short alkane chains [46][47][48], and in MD [49][50][51][52] or MC [39,53] simulations. Just as for monomeric athermal hard spheres, off-lattice MC simulations have shown that random packings of fully flexible linear chains of tangent hard spheres are able to crystallize at high volume fractions through an entropy-driven mechanism, very similar to the one of monomeric analogs [37,[40][41][42]54].…”

Section: Introductionmentioning

confidence: 99%

“…However, both the FCC or RHCP crystals of tangent hard-sphere chains are usually free of twin defects due to a conformational entropic barrier [57]. It has been established that the phase transition and the ordered morphologies of hard-sphere chains are affected insignificantly by chain length, but are sensitive to factors such as gaps in bond lengths [43,58], the presence of surfaces/confinement [44,59,60] and chain stiffness [61][62][63][64].…”

Section: Introductionmentioning

confidence: 99%

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Local and Global Order in Dense Packings of Semi-flexible Polymers of Hard Spheres

Martínez-Fernández¹,

Herranz²,

Foteinopoulou³

et al. 2023

Preprint

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The local and global order in dense packings of linear, semi-flexible polymers of tangent hard spheres are studied by employing extensive Monte Carlo simulations at increasing volume fractions. Chain stiffness is controlled by a tunable harmonic potential for the bending angle whose intensity dictates the rigidity of the polymer backbone as a function of the bending constant and equilibrium angle. The studied angles range from acute to obtuse ones, reaching the limit of rod-like polymers. We analyze how packing density and chain stiffness affect the ability of chains to self-organize at the local and global levels. The former corresponds to crystallinity as quantified by the Characteristic Crystallographic Element (CCE) norm descriptor, while the latter is computed through the scalar orientational order parameter. In all cases, we identify the critical volume fraction for the phase transition and gauge the established crystal morphologies, developing a complete phase diagram as a function of packing density and equilibrium bending angle. A plethora of structures is obtained, ranging from random hexagonal closed packed morphologies of mixed character and almost perfect face centered cubic (FCC) and hexagonal close-packed (HCP) crystals at the level of monomers, to nematic mesophases, with prolate and oblate mesogens at the level of chains. For rod-like chains, hysteresis is observed between the establishment of long-range nematic order and crystallization, while for right-angle chains both transitions are synchronized. A comparison is also provided against the analogous packings of monomeric and fully flexible chains of hard spheres.

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“…In spite of these difficulties, a wide variety of increasingly more efficient MC methods have been developed over the last decades [80,81,[84][85][86][87][88][89][90]. The work to be reported in this manuscript is based on a powerful suite of advanced MC moves [91] which has enabled us in the past to observe the entropy-driven athermal polymer crystallization for the first time [73] and to identify and analyze the factors that affect the phenomenon, including chain length and its distribution [73,92], the presence of bond gaps or tangency [93] and confinement in one [94] or all three [95] dimensions.…”

Section: Introductionmentioning

confidence: 99%

Polymorphism and Perfection in Crystallization of Hard Sphere Polymers

Herranz¹,

Foteinopoulou²,

Karayiannis³

et al. 2022

Preprint

Self Cite

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We present results on the spontaneous crystallization of freely-jointed polymers of hard spheres obtained in an unprecedentedly long Monte Carlo (MC) simulation on a system of 54 chains of 1000 monomers. Starting from a purely amorphous configuration and after a transitory dominance of the hexagonal closed packed (HCP) polymorph, the system crystallizes in a final, stable, face centered cubic (FCC) crystal of very high perfection. Through refined metrics we gauge the degree of ordering and identify the regions of the phase transition and the corresponding morphologies. An analysis of chain conformational characteristics, of the spatial distribution of monomers and of the volume accessible to them shows that the phase transition is caused by an increase in translational entropy that is larger than the loss of conformational entropy of the chains in the crystal compared to the amorphous state. Polymer chains in the crystal adopt ideal random walk statistics as their great length renders local conformational details, imposed by the geometry of the FCC crystal, irrelevant.

show abstract

Crystallization of Flexible Chains of Tangent Hard Spheres under Full Confinement

Cited by 13 publications

References 103 publications

Polymorphism and Perfection in Crystallization of Hard Sphere Polymers

Polymorphism and Perfection in Crystallization of Hard Sphere Polymers

Local and Global Order in Dense Packings of Semi-flexible Polymers of Hard Spheres

Polymorphism and Perfection in Crystallization of Hard Sphere Polymers

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