Finite Size Scaling and Running Coupling Constant in CP(N-1) models
Abstract
In this work I present a numerical study of the Finite Size Scaling (FSS) of a correlation length in the framework of the CP N-1 model by means of the 1/N expansion. This study has been thought as propedeutical to the application of FSS to the measure on the lattice of a new coupling constant fx(1/R), defined in terms or rectangular Wilson Loops. I give also a perturbative expansion of fx(1/R) in powers of the corresponding coupling constant in the MS scheme together with some preliminary numerical results obtained from the Polyakov ratio and I point out the conceptual problems that limit this approach.
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