Abstract
We performed Monte Carlo simulations of two-dimensional q-state Potts models with q=10, 15, and 20 and measured the spin-spin correlation function at the first-order transition point {beta}{sub t} in the disordered and ordered phase. Our results for the correlation length {xi}{sub d}({beta}{sub t}) in the disordered phase are compatible with an analytic formula. Estimates of the correlation length {xi}{sub 0}({beta}{sub t}) in the ordered phase yield strong numerical evidence that R{identical_to}{xi}{sub 0}({beta}{sub t})/{xi}{sub d}({beta}{sub t})=1. ((orig.)).
Citation Formats
Janke, W, and Kappler, S.
Ordered vs disordered: Correlation lengths of 2D Potts models at {beta}{sub t}.
Netherlands: N. p.,
1995.
Web.
doi:10.1016/0920-5632(95)00377-L.
Janke, W, & Kappler, S.
Ordered vs disordered: Correlation lengths of 2D Potts models at {beta}{sub t}.
Netherlands.
https://doi.org/10.1016/0920-5632(95)00377-L
Janke, W, and Kappler, S.
1995.
"Ordered vs disordered: Correlation lengths of 2D Potts models at {beta}{sub t}."
Netherlands.
https://doi.org/10.1016/0920-5632(95)00377-L.
@misc{etde_101054,
title = {Ordered vs disordered: Correlation lengths of 2D Potts models at {beta}{sub t}}
author = {Janke, W, and Kappler, S}
abstractNote = {We performed Monte Carlo simulations of two-dimensional q-state Potts models with q=10, 15, and 20 and measured the spin-spin correlation function at the first-order transition point {beta}{sub t} in the disordered and ordered phase. Our results for the correlation length {xi}{sub d}({beta}{sub t}) in the disordered phase are compatible with an analytic formula. Estimates of the correlation length {xi}{sub 0}({beta}{sub t}) in the ordered phase yield strong numerical evidence that R{identical_to}{xi}{sub 0}({beta}{sub t})/{xi}{sub d}({beta}{sub t})=1. ((orig.)).}
doi = {10.1016/0920-5632(95)00377-L}
journal = []
volume = {42}
journal type = {AC}
place = {Netherlands}
year = {1995}
month = {Apr}
}
title = {Ordered vs disordered: Correlation lengths of 2D Potts models at {beta}{sub t}}
author = {Janke, W, and Kappler, S}
abstractNote = {We performed Monte Carlo simulations of two-dimensional q-state Potts models with q=10, 15, and 20 and measured the spin-spin correlation function at the first-order transition point {beta}{sub t} in the disordered and ordered phase. Our results for the correlation length {xi}{sub d}({beta}{sub t}) in the disordered phase are compatible with an analytic formula. Estimates of the correlation length {xi}{sub 0}({beta}{sub t}) in the ordered phase yield strong numerical evidence that R{identical_to}{xi}{sub 0}({beta}{sub t})/{xi}{sub d}({beta}{sub t})=1. ((orig.)).}
doi = {10.1016/0920-5632(95)00377-L}
journal = []
volume = {42}
journal type = {AC}
place = {Netherlands}
year = {1995}
month = {Apr}
}