ZIB

Hits per page

hits 1 - 2 | 2 hits

Sorting

Electronic Resource

Zeros of the finite-size scaling region partition function for a model with a wetting transition (1990)

Smith, E. R.

Springer

Journal of statistical physics 60 (1990), S. 529-549

add to mindlist on the mindlist

Details

ISSN: 1572-9613

Keywords: Wetting transition ; finite-size scaling ; partition function zeros

Source: Springer Online Journal Archives 1860-2000

Topics: Physics

Notes: Abstract We derive a finite-size scaling representation for the partition function for an Onsager-Temperley string model with a wetting transition, and analyze the zeros of this partition function in the complex scaled coupling parameter of relevance. The system models the one-dimensional interface between two phases in a rectangular two-dimensional region (x, y) ∈ℝ2,−L ≤y⩽L,o≤x≤N. The two phases are at coexistence. The string or interface has a surface tension 2KkT per unit length and an extra Boltzmann weighta per unit length if it touches the surfaces aty=±L. There is a critical valuea c=1/2K and fora〉a c the string is confined to one of the surfaces, while fora ťa c the string moves roughly in the rectangular region. The finite-size scaling parameters are α=a c 2 N/L 2 and ζ=L(a−a c)/a c 2 . We find that for |ζ| large, the zeros of the scaled partition function lie close to the lines arg(ζ)=±π/4 with re(ζ)〉0. We discuss the motion of all the zeros as α changes by both analytic and numerical arguments.

Type of Medium: Electronic Resource

URL: http://dx.doi.org/10.1007/BF01025981

Permalink

Library	Location	Call Number	Volume/Issue/Year	Availability

Others were also interested in ...

Paper (German National Licenses)

Fulltext

Electronic Resource

Simulation calculation of dielectric constants: Comparison of methods on an exactly solvable model (1990)

Morrow, T. J. ; Smith, E. R.

Springer

Journal of statistical physics 61 (1990), S. 187-201

add to mindlist on the mindlist

Details

ISSN: 1572-9613

Keywords: Spherical model ; dipolar systems ; dielectric constant ; dipolar system simulation

Source: Springer Online Journal Archives 1860-2000

Topics: Physics

Notes: Abstract A mean spherical model of classical dipoles on a simple cubic lattice of sideM=2N+1 sites is considered. Exact results are obtained for finite systems using periodic boundary conditions with an external dielectric constantɛ′ and using reaction field boundary conditions with a cutoff radiusR c ⩽N and an external dielectric constantɛ′. The dielectric constant in the disordered phase is calculated using a variety of fluctuation formulas commonly implemented in Monte Carlo and molecular dynamics simulations of dipolar systems. The coupling in the system is measured by the parametery=4πμ 2/9kT, whereμ 2 is the fixed mean square value of the dipole moments on the lattice. The system undergoes a phase transition aty≈2.8, so that very high dielectric constants cannot be obtained in the disordered phase. The results show clearly the effects of system size, cutoff radius, external dielectric constant, and different measuring techniques on a dielectric constant estimate. It is concluded that with periodic boundary conditions, the rate of approach of the dielectric constant estimate to its thermodynamic limit is asN −2/3 and depends only weakly onɛ′. Methods of implementing reaction field boundary conditions to give rapid convergence to the thermodynamic limit are discussed.

Type of Medium: Electronic Resource

URL: http://dx.doi.org/10.1007/BF01013960

Permalink

Library	Location	Call Number	Volume/Issue/Year	Availability

Others were also interested in ...

Paper (German National Licenses)

Fulltext

hits 1 - 2 | 2 hits