Flory Exponents from a Self-Consistent Renormalization Group

Abstract

The wandering exponent for an isotropic polymer is predicted remarkably well by a simple argument due to Flory. By considering oriented polymers living in a one-parameter family of background tangent fields, we are able to relate the wandering exponent to the exponent in the background field through an ε-expansion. We then choose the background field to have the same correlations as the individual polymer, thus self-consistently solving for . We find =3/(d+2) for d<4 and =1/2 for d 4, which is exactly the Flory result.

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