Characterization of the High-Pressure Structural Transition and Thermodynamic Properties in Sodium Chloride: A Computational Investigation on the Basis of the Density Functional Theory

Lü, Cheng; Kuang, Xiao‐Yu; Zhu, Qihe

doi:10.1021/jp805945v

Cited by 9 publications

(5 citation statements)

References 52 publications

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“…2. It is clearly seen that our calculation correctly predicts the cF8 → cP2 transition at 25 GPa, in good agreement with experiments [8,34,35] and earlier theoretical calculations [2,36,37], validating our methodology in the application to NaCl. Here, the cP2 structure is stable up to 322 GPa, above which the oC8 and oI8 structures become favorable and stable in the pressure ranges 322-645 GPa and 645-683 GPa, respectively.…”

supporting

confidence: 88%

“…Sodium chloride (NaCl), also known as salt, is one of the most widely used colorless nonmetallic mineral materials. It plays a very important role in biology, chemistry, and several other scientific disciplines as well as being an absolutely necessary material for human life, equal in importance to water [1,2]. Many ionic solids (e.g., alkali halides, alkali hydrides, etc.)…”

mentioning

confidence: 99%

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High-pressure structures and metallization of sodium chloride

Chen¹,

Ma²

2012

EPL

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High-pressure effects in solids and liquids PACS 61.50.-f -Structure of bulk crystals PACS 71.20.-b -Electron density of states and band structure of crystalline solidsAbstract -Sodium chloride (NaCl) is known as salt and an ionic insulator at ambient conditions. The high-pressure structures of NaCl have been extensively explored through a particle swarm structural search at zero temperature and pressure range of 0-800 GPa. In addition to the known low-pressure insulating phases, we find three novel orthorhombic high-pressure structures: oC8 (stable at 322-645 GPa), oI8 (stable at 645-683 GPa), and oP16 (stable at above 683 GPa). The oC8 structure can be metallized via band-gap closure under high pressure, while both oI8 and oP16 are metallic in their stable pressure ranges. Intriguingly, our predicted metallic high-pressure phases of NaCl retain predominant ionic behaviors. The peculiar conductive behaviors can be attributed to the extended anion sublattice.

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confidence: 88%

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confidence: 99%

High-pressure structures and metallization of sodium chloride

Chen¹,

Ma²

2012

EPL

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“…The normalization per µN load leaves Equation insensitive to creep‐on‐load, so that W trans values can be calculated for every load and temperature of interest. We note here, that published bulk‐ and Young's‐modulus calculations for hydrostatic pressure conditions in diamond pressure cells are “in good agreement with experiments.” The moduli increase strongly for B1‐NaCl with increasing pressure, and further so but less‐steeply for B2‐NaCl after the phase transition (Lu et al ., ) (see Physical Background section). However, in situ diffraction experiments wait for final decision about the type of transition under the Berkovich indenter.…”

Section: Discussionmentioning

confidence: 99%

“…The hydrostatic transformation pressure upon isothermal compression of five research groups varies from 28.2 to 30.6 GPa with the preferred value at 29.2 GPa (Piermarini and Block, ) or 26.8 GPa (Li and Jeanloz, ). The hydrostatic transformation pressure has been amply theoretically calculated (Lu et al ., ). The higher transition from the CsCl‐type structure of NaCl to the layered CrB‐type structure (space group Cmcm ) of sodium chloride would occur from 322 GPa hydrostatic pressures on (Chen and Ma, ).…”

Section: Physical Backgroundmentioning

confidence: 97%

“…It was obtained at “quasi‐hydrostatic” conditions (with laser annealing) in diamond anvil cells and by using the modified third‐order Birch–Murnaghan equation of states (EOS) or the modified universal EOS (Sata et al ., ). The strong increase of the B2‐bulk modulus from 30 GPa pressure to 70 GPa pressure was obtained from first principle calculations on the basis of density functional theory (139.445 and 270.391 GPa, respectively), and similar calculations of Young's modulus gave 217.880 and 344.963 GPa for 30 and 70 GPa, respectively (Lu et al ., ). Fei et al .…”

Section: Physical Backgroundmentioning

confidence: 97%

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Activation energy of the low-load NaCl transition from nanoindentation loading curves

Kaupp

2014

Scanning

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Access to activation energies E(a) of phase transitions is opened by unprecedented analyses of temperature dependent nanoindentation loading curves. It is based on kinks in linearized loading curves, with additional support by coincidence of kink and electrical conductivity of silicon loading curves. Physical properties of B1, B2, NaCl and further phases are discussed. The normalized low-load transition energy of NaCl (Wtrans/µN) increases with temperature and slightly decreases with load. Its semi-logarithmic plot versus T obtains activation energy E(a)/µN for calculation of the transition work for all interesting temperatures and pressures. Arrhenius-type activation energy (kJ/mol) is unavailable for indentation phase transitions. The E(a) per load normalization proves insensitive to creep-on-load, which excludes normalization to depth or volume for large temperature ranges. Such phase transition E(a)/µN is unprecedented material's property and will be of practical importance for the compatibility of composite materials under impact and further shearing interactions at elevated temperatures.

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Penetration Resistance and Penetrability in Pyramidal (Nano)Indentations

2012

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Pyramidal nanoindentation loading curves were linearly plotted, normal force versus (penetration depth)(3/2) . The slope is penetration resistance k, its inverse penetrability. Linear correlations verify. All contributions to the indentation are included in the penetrability. Dependencies and uses of the extrapolation tools are exemplified, identified, and discussed. In the case of phase transition including twinning within the loading range a sharp kink occurs, again with verifying correlation in both branches of the linear plot. The exponent 3/2 applies to all types of materials upon conical or pyramidal indentations onto normal flat surfaces, independent of the various mechanistic responses. While common curve fitting procedures of loading curves and finite element (FE) calculations miss phase transitions, gradients, surface effects, elbows, (nano)pores, and change from tip rounding to cone (at very low penetrations), these are recognized by the penetration resistance analysis. Also prominent undisturbed pyramidal or conical micro- and macroindentations provide linear plots with exponent 3/2. Numerous FE simulations create experimentally unsupported "loading curves." This is discussed with typical published examples. An explanation for the deviation from Sneddon's and Love's theory is given by correction for the shear-force part that does not participate in the penetration depth. The validation of the exponent 3/2 instead of previously assumed 2 requires adjustment of mechanical parameters that were defined by using the nonsupported exponent.

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Characterization of the High-Pressure Structural Transition and Thermodynamic Properties in Sodium Chloride: A Computational Investigation on the Basis of the Density Functional Theory

Cited by 9 publications

References 52 publications

High-pressure structures and metallization of sodium chloride

High-pressure structures and metallization of sodium chloride

Activation energy of the low-load NaCl transition from nanoindentation loading curves

Penetration Resistance and Penetrability in Pyramidal (Nano)Indentations

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