Hausdorff dimension of critical fluctuations in abelian gauge theories
Abstract
The geometric properties of the critical fluctuations in abelian gauge theories such as the Ginzburg-Landau model are analyzed in zero background field. Using a dual description, we obtain scaling relations between exponents of geometric and thermodynamic nature. In particular we connect the anomalous scaling dimension η of the dual matter field to the Hausdorff dimension DH of the critical fluctuations, which are fractal objects. The connection between the values of η and DH, and the possibility of having a thermodynamic transition in finite background field, is discussed.
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