Fragilities of liquids predicted from the random first order transition theory of glasses

Xia, Xiaoyu; Wolynes, Peter G.

doi:10.1073/pnas.97.7.2990

Cited by 388 publications

(421 citation statements)

References 32 publications

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“…The universal features of the dynamics of supercooled liquids and glasses are explained by the random first order transition theory 1,25,37,38 . At the mean field theory level the underlying microscopic framework provides a description of several characteristic transition temperatures that are expected in glassy systems.…”

Section: Theory Microscopic Theories Of the Glass And Liquidmentioning

confidence: 99%

Intermolecular Forces and the Glass Transition

Hall

Wolynes

2007

J. Phys. Chem. B

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Random first order transition theory is used to determine the role of attractive and repulsive interactions in the dynamics of supercooled liquids. Self-consistent phonon theory, an approximate mean field treatment consistent with random first order transition theory, is used to treat individual glassy configurations, while the liquid phase is treated using common liquid state approximations.Free energies are calculated using liquid state perturbation theory. The transition temperature T * A , the temperature where the onset of activated behavior is predicted by mean field theory, the lower crossover temperature T * c where barrierless motions actually occur through fractal or stringy motions (corresponding to the phenomenological mode coupling transition temperature), and T * K , the Kauzmann temperature (corresponding to an extrapolated entropy crisis), are calculated in addition to T * g , the glass transition temperature that corresponds to laboratory cooling rates. Relationships between these quantities agree well with existing experimental and simulation data on van der Waals liquids. Both the isobaric and isochoric behavior in the supercooled regime are studied, providing results for ∆C V and ∆C p that can be used to calculate the fragility as a function of density and pressure, respectively. The predicted variations in the α-relaxation time with temperature and density conform to the empirical density-temperature scaling relations found by Casalini and Roland. We thereby demonstrate the microscopic origin of their observations. Finally, the relationship first suggested by Sastry between the spinodal temperature and the Kauzmann temperatures, as a function of density, is examined. The present microscopic calculations support the existence of an intersection of these two temperatures at sufficiently low temperatures.2

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Section: Theory Microscopic Theories Of the Glass And Liquidmentioning

confidence: 99%

Intermolecular Forces and the Glass Transition

Hall

Wolynes

2007

J. Phys. Chem. B

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“…2 offers the opportunity to find the DW factor u 2 g at the glass transition of the model polymer system. At the glass transition τ α = τ α g ≡ 10 2 s in laboratory units 1 24 (f ∼ = 0.1). Our data yield f ∼ 0.12-0.13 (d is taken from the monomer radial distribution function), which is close to f = 0.129 for the melting of a hard-sphere face-centred cubic solid 22 .…”

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Universal scaling between structural relaxation and vibrational dynamics in glass-forming liquids and polymers

et al. 2007

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If liquids, polymers, bio-materials, metals and molten salts can avoid crystallization during cooling or compression, they freeze into a microscopically disordered solid-like state, a glass 1,2 . On approaching the glass transition, particles become trapped in transient cages-in which they rattle on picosecond timescales-formed by their nearest neighbours; the particles spend increasing amounts of time in their cages as the average escape time, or structural relaxation time τ α , increases from a few picoseconds to thousands of seconds through the transition. Owing to the huge difference between relaxation and vibrational timescales, theoretical 3-9 studies addressing the underlying rattling process have challenged our understanding of the structural relaxation. Numerical 10-13 and experimental studies on liquids 14 In the solid state atoms oscillate with mean square amplitude u 2 around their equilibrium positions (henceforth to be referred to as the Debye-Waller (DW) factor). With increasing temperature, solids meet different fates depending on the structural degree of order. In the crystalline state the ordered structure melts at T m , whereas in the amorphous state the disordered structure softens at the glass transition temperature T g , above which flow occurs with viscosity η. The empirical law T g 2/3T m (refs 1,2,7) suggests that the two phenomena have a common basis. In fact, this viewpoint motivated extensions to glasses 24 of the Lindemann melting criterion for crystalline solids 22 and pictures the glass transition as a freezing in an aperiodic crystal structure (ACS) 5 .According to the ACS model, the viscous flow is due to activated jumps over energy barriers E ∝ k B T a 2 / u 2 , where a is the displacement to overcome the barrier, k B is the Boltzmann constant and T the temperature. The usual rate theory leads to the Hall-Wolynes (HW) equation 5,21 τ α , η ∝ exp(a 2 /2 u 2 ). u 2 is the DW factor of the liquid, that is, it is the amplitude of the rattling motion within the cage of the surrounding atoms. This vibrational regime is assumed to occur on short timescales largely separated by those of the brownian diffusion. The ACS model is expected to fail when τ α becomes comparable to the typical rattling times corresponding to picosecond timescales, a condition that is met at high temperatures (for example, in selenium it occurs at T m + 104 K (ref. 14)).

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“…In this framework, more than forty years ago Adam and Gibbs [1] theorized that such a pronounced temperature dependence of the structural correlation time is due to a cooperative process involving several basic structural units forming cooperatively rearranging regions (CRR), which size increases with decreasing temperature. Since then a great deal of theoretical approaches [2,3] as well as simulation studies [4] and very recently experimental studies employing multipoint dynamical susceptibilities [5] have been devoted in the search of good candidates for CRR as well as its size and temperature dependence. All of these studies suggest that a growing correlation length with decreasing temperature of the order of several nanometers exists.…”

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Route to calculate the length scale for the glass transition in polymers

2007

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The occurrence of glass transition is believed to be associated to cooperative motion with a growing length scale with decreasing temperature. We provide a novel route to calculate the size of cooperatively rearranging regions CRR of glass-forming polymers combining the Adam-Gibbs theory of the glass transition with the self-concentration concept. To do so we explore the dynamics of glass-forming polymers in different environments. The material specific parameter α connecting the size of the CRR to the configurational entropy is obtained in this way. Thereby, the size of CRR can be precisely quantified in absolute values. This size results to be in the range 1 ÷ 3 nm at the glass transition temperature depending on the glass-forming polymer.PACS numbers: 64.70. Pf, 83.80.Tc, 83.80.Rs, 77.22.Gm The nature of the glass transition is one of the most important unsolved problems in condensed matter physics and research in this field has enormously intensified in the last decades due to its strong fundamental as well as applicative implications. Among the peculiar phenomena displayed by glass-forming liquids, the super-Arrhenius temperature dependence of the viscosity and the structural correlation time is certainly one of the most intriguing. In this framework, more than forty years ago Adam and Gibbs [1] theorized that such a pronounced temperature dependence of the structural correlation time is due to a cooperative process involving several basic structural units forming cooperatively rearranging regions (CRR), which size increases with decreasing temperature. Since then a great deal of theoretical approaches [2,3] as well as simulation studies [4] and very recently experimental studies employing multipoint dynamical susceptibilities [5] have been devoted in the search of good candidates for CRR as well as its size and temperature dependence. All of these studies suggest that a growing correlation length with decreasing temperature of the order of several nanometers exists. According to the Adam-Gibbs (AG) theory of the glass transition, the increase of the structural relaxation time with decreasing temperature, accompanied by the growth of the cooperative length scale, is due to the decrease of the number of configurations the glassformer can access, namely the configurational entropy (S c ) of the system. The connection between the structural relaxation time and S c is expressed by [1]:where C is a glass-former specific temperature independent parameter and τ 0 is the pre-exponential factor. The dynamics of a large number of glass forming systems have been successfully described through the AG equation in both experiments for low molecular weight glass formers [6] and polymers [7], as well as simulations [8]. Apart from the relation between the relaxation time and the configurational entropy, the AG theory provides a connection between the number of basic structural units belonging to the CRR and the configurational entropy: N ≈ S −1 . Several recent simulations studies, where the cooperative length scale and...

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Fragilities of liquids predicted from the random first order transition theory of glasses

Cited by 388 publications

References 32 publications

Intermolecular Forces and the Glass Transition

Intermolecular Forces and the Glass Transition

Universal scaling between structural relaxation and vibrational dynamics in glass-forming liquids and polymers

Route to calculate the length scale for the glass transition in polymers

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