Physics – High Energy Physics – High Energy Physics - Lattice
Scientific paper
1992-04-08
Physics
High Energy Physics
High Energy Physics - Lattice
Scientific paper
The distance scale for a quantum field theory is the correlation length $\xi$, which diverges with exponent $\nu$ as the bare mass approaches a critical value. If $t=m^{2}-m_{c}^{2}$, then $\xi=m_{P}^{-1} \sim t^{-\nu}$ as $t \to 0$. The two-point function of a scalar field has a random walk representation. The walk takes place in a background of fluctuations (closed walks) of the field itself. We describe the connection between properties of the walk and of the two-point function. Using the known behavior of the two point function, we deduce that the dimension of the walk is $d_{w}=\phi / \nu$ and that there is a singular relation between $t$ and the energy per unit length of the walk $\theta \sim t^{\phi}$ that is due to the singular behavior of the background at $t=0$. ($\phi$ is a computable crossover exponent.)
Kiskis Joe
Narayanan Rajamani
Vranas Pavlos
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