TY - JOUR
T1 - Fixed boundary conditions analysis of the 3d gonihedric Ising model with k=0
JF - Physics Letters B
Y1 - 2004
A1 - Baig, MariĆ
A1 - Clua, J.
A1 - Johnston, D. A.
A1 - Villanova, R.
KW - Author Keywords: Spin systems
KW - Fixed boundary conditions
KW - Gonihedric models
KW - Phase transitions
AB - The gonihedric Ising model is a particular case of the class of models defined by Savvidy and Wegner intended as discrete versions of string theories on cubic lattices. In this Letter we perform a high statistics analysis of the phase transition exhibited by the 3d gonihedric Ising model with k=0 in the light of a set of recently stated scaling laws applicable to first order phase transitions with fixed boundary conditions. Even though qualitative evidence was presented in a previous paper to support the existence of a first order phase transition at k=0, only now are we capable of pinpointing the transition inverse temperature at $\beta$c=0.54757(63) and of checking the scaling of standard observables.
VL - 585
UR - http://www.sciencedirect.com/science?\_ob=ArticleURL&\_udi=B6TVN-4BSN95Y-3&\_user=1517286&\_coverDate=04%2F08%2F2004&\_rdoc=1&\_fmt=high&\_orig=search&\_sort=d&\_docanchor=&view=c&\_acct=C000053449&\_version=1&\_urlVersion=0&\_userid=1517286&md5=b8fb559f9
ER -
TY - JOUR
T1 - Scaling laws for the two-dimensional eight-state Potts model with fixed boundary conditions
JF - Physical Review B
Y1 - 2002
A1 - Baig, M.
A1 - Villanova, R.
VL - 65
UR - http://prb.aps.org/abstract/PRB/v65/i9/e094428
ER -