Continuously Varying Exponents for Oriented Self-Avoiding Walks

Abstract

A two-dimensional conformal field theory with a conserved U(1) current J, when perturbed by the operator J\,2, exhibits a line of fixed points along which the scaling dimensions of the operators with non-zero U(1) charge vary continuously. This result is applied to the problem of oriented polymers (self-avoiding walks) in which the short-range repulsive interactions between two segments depend on their relative orientation. While the exponent describing the fractal dimension of such walks remains fixed, the exponent γ, which gives the total number Nγ-1μN of such walks, is predicted to vary continuously with the energy difference.

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