![[Back]](/images/prevpage.gif)
![[Index]](/images/index.gif)
![[Help]](/images/help.gif)
![[MSI]](/images/msi.gif)
![[ANU Online]](/images/online.gif)
Mathematics Research Report MRR95-069
Surface Critical Phenomena And Scaling In The Eight Vertex Model
M. T. Batchelor and Y. K. Zhou
Abstract:
We give a physical interpretation of the entries of the reflection
$K$-matrices of Baxter's eight-vertex model in terms of an Ising
interaction at an open boundary. Although the model still defies an
exact solution we nevertheless obtain the exact surface free energy
from a crossing-unitarity relation. The singular part of the surface
energy is described by the critical exponents
$\alpha_s = 2 - \frac{\pi}{2\mu}$ and $\alpha_1 = 1 - \frac{\pi}{\mu}$,
where $\mu$ controls the strength of the four-spin interaction.
These values reduce to the known Ising exponents
at the decoupling point $\mu=\pi/2$ and confirm the scaling relations
$\alpha_s = \alpha_b + \nu$ and $\alpha_1 = \alpha_b -1$.
This service is maintained by the
Mathematical Sciences Institute (MSI)
Comments to
webmaster@maths.anu.edu.au
URL: http://wwwmaths.anu.edu.au/