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On the equation of state of classical one-component systems with long-range forces (1980)

Choquard, Ph. ; Favre, P. ; Gruber, Ch.

Springer

Journal of statistical physics 23 (1980), S. 405-442

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ISSN: 1572-9613

Keywords: Long-range forces ; equilibrium states ; BBGKY equation ; equation of state ; one-component plasma ; shape dependence

Source: Springer Online Journal Archives 1860-2000

Topics: Physics

Notes: Abstract Several definitions of the “pressure” are introduced for one-component systems and shown to be nonequivalent in the presence of a rigid neutralizing background. Relations between these pressures are derived for finite and infinite systems; these relations depend on the asymptotic behavior of the force at infinity, with the Coulomb force at the borderline between different properties. It is argued that only one of those definitions is physically acceptable and its properties are discussed in relation to the asymptotic behavior of the force. It is seen in particular that a knowledge of the state of the infinite system is not sufficient to determine its thermodynamic properties. The results are illustrated by some typical examples.

Type of Medium: Electronic Resource

URL: http://dx.doi.org/10.1007/BF01011574

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On the dielectric susceptibility of classical Coulomb systems (1986)

Choquard, Ph. ; Piller, B. ; Rentsch, R.

Springer

Journal of statistical physics 43 (1986), S. 197-205

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ISSN: 1572-9613

Keywords: Dielectric susceptibility ; Clausius-Mossotti relation ; phenomenological electrostatics ; Stillinger-Lovett sum rule ; linear response theory ; statistical mechanics ; one-component plasma ; disk and strip geometry ; thermodynamic limit

Source: Springer Online Journal Archives 1860-2000

Topics: Physics

Notes: Abstract This paper reports exact and numerical results on the shape dependence of the dielectric susceptibility of the one-component plasma (O.C.P.) in two dimensions. Some apparently conflicting predictions of phenomenological electrostatics and statistical mechanics are resolved. We prove indeed that, for a disk shaped two-dimensional one-component plasma at the particular temperatureT 0 =q 2 (2K B )−1, the Clausius-Mossotti relation is exactly fulfilled. It yields a value of the susceptibility which is twice that given by the second moment Stillinger-Lovett sum rule. Similar results are reported for the strip geometry. These discrepancies are explained in terms of shape dependent versus shape independent thermodynamic limits. We report also exact and numerical results on the size dependence of the dielectric susceptibility of the systems quoted above.

Type of Medium: Electronic Resource

URL: http://dx.doi.org/10.1007/BF01010577

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Statistical mechanics of elastic moduli (1986)

Bavaud, F. ; Choquard, Ph. ; Fontaine, J. -R.

Springer

Journal of statistical physics 42 (1986), S. 621-646

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ISSN: 1572-9613

Keywords: Classical fluids ; correlation functions ; Euclidean invariance ; shear modulus

Source: Springer Online Journal Archives 1860-2000

Topics: Physics

Notes: Abstract We consider continuous systems of particles in the framework of classical statistical mechanics and derive a general expression for the static elastic moduli tensor in terms of correlation functions. We find sufficient conditions for the vanishing of the shear modulus. Relationships between these conditions and others insuring translational or rotational invariance are discussed.

Type of Medium: Electronic Resource

URL: http://dx.doi.org/10.1007/BF01127732

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The two-dimensional one-component plasma at Γ=2: The semiperiodic strip (1983)

Choquard, Ph. ; Forrester, P. J. ; Smith, E. R.

Springer

Journal of statistical physics 33 (1983), S. 13-22

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ISSN: 1572-9613

Keywords: Long-range order ; semiperiodic boundary conditions ; two-dimensional-one-component plasma

Source: Springer Online Journal Archives 1860-2000

Topics: Physics

Notes: Abstract The one-component two-dimensional plasma is studied in a strip of finite width, replicated periodically parallel to the long axis of the strip. Exact results for the one- and two-particle distribution functions are found at coupling Γ=q 2/kT =2. The system is inhomogeneous: the one- and two-particle distribution functions show long-range order.

Type of Medium: Electronic Resource

URL: http://dx.doi.org/10.1007/BF01009744

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On the dielectric susceptibility of classical Coulomb systems. II (1987)

Choquard, Ph. ; Piller, B. ; Rentsch, R.

Springer

Journal of statistical physics 46 (1987), S. 599-633

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ISSN: 1572-9613

Keywords: One- and two-component plasmas ; dielectric susceptibility ; partial second moment ; shape-dependent effects

Source: Springer Online Journal Archives 1860-2000

Topics: Physics

Notes: Abstract This paper deals with the shape dependence of the dielectric susceptibility (equivalently defined, in a canonical ensemble, by the mean square fluctuation of the electric polarization or by the second moment of the charge-charge correlation function) of classical Coulomb systems. The concept of partial second moment is introduced with the aim of analyzing the contributions to the total susceptibility of pairs of particles of increasing separation. For a diskshaped one-component plasma with coupling parameter γ=2 it is shown, numerically and algebraically for small and large systems, that (1) the correlation function of two particles close to the edge of the disk decays as the inverse of the square of their distance, and (2) the susceptibility is made up of a bulk contribution, which saturates rapidly toward the Stillinger-Lovett value, and of a surface contribution, which varies on the scale of the disk diameter and is described by a new law called the “arc sine” law. It is also shown that electrostatics and statistical mechanics with shape-dependent thermodynamic limits are consistent for the same model in a strip geometry, whereas the Stillinger-Lovett sum rule is verified for a boundary-free geometry such as the surface of a sphere. Some results of extensive computer simulations of one- and two-component plasmas in circular and elliptic geometries are shown. Anisotropy effects on the susceptibilities are clearly demonstrated and the “arc sine” law for a circular plasma is well confirmed.

Type of Medium: Electronic Resource

URL: http://dx.doi.org/10.1007/BF01013377

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Surface properties of finite classical Coulomb systems: Debye-Hückel approximation and computer simulations (1989)

Choquard, Ph. ; Piller, B. ; Rentsch, R. ; [et al.]

Springer

Journal of statistical physics 55 (1989), S. 1185-1262

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ISSN: 1572-9613

Keywords: Phenomenological electrostatics ; shape-dependent effects ; dielectric susceptibility ; surface correlations ; Debye-Hückel approximation ; grand ensemble computer simulation

Source: Springer Online Journal Archives 1860-2000

Topics: Physics

Notes: Abstract We report analytical and numerical studies of surface correlations in finite, homogeneously polarizable, classical Coulomb systems placed in an insulating or conducting environment. Their purpose is to understand the phenomenological, shape-dependent laws of electrostatics, from the point of view of statistical mechanics; we focus on the knowledge of the dielectric susceptibility of the system, a quantity proportional to the equilibrium fluctuation of the system's instantaneous polarization per unit volume. This goal has been achieved for a system in a conducting state. The picture is that the shape-dependent part of the susceptibilities results from the action of unbounded observables (the second moments of the instantaneous polarization of the system) on long-range surface correlations and that the relations of electrostatics are verified by means of shape-dependent thermodynamic limits. This picture is supported (i) by exact solutions and asymptotic analysis of the Debye-Hückel approximation of multicomponent plasmas in disks and spheres with insulating and conducting environment and also in ellipses in a vacuum, and (ii) by computer simulations of a one-component plasma in a disk with different environments, notably a conducting environment with permeable and impermeable wall. These observations have revealed for the first time the reason why the susceptibility of a conducting disk in a conductor with impermeable walls diverges linearly with the radius of the disk: this is due to the occurrence of long-range radial correlations in the conductor. These findings are quantitatively interpreted in terms of a novel “canonical” Debye-Huckel approximation as contrasted to the ordinary “grand canonical” version. Lastly a fresh look at the problem of the surface correlations of a conductor in a vacuum, which places the observer close to the surface of the conductor but in the vacuum, is presented and applied to the disk, the ellipse, the cylinder, the sphere, and the wedge.

Type of Medium: Electronic Resource

URL: http://dx.doi.org/10.1007/BF01041085

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