Roughness and critical force for depinning at 3-loop order

Abstract

A d-dimensional elastic manifold at depinning is described by a renormalized field theory, based on the Functional Renormalization Group (FRG). Here we analyze this theory to 3-loop order, equivalent to third order in ε=4-d, where d is the internal dimension. The critical exponent reads ζ = ε3 + 0.04777 ε2 -0.068354 ε3 + O(ε4). Using that ζ(d=0)=2-, we estimate ζ(d=1)=1.266(20), ζ(d=2)=0.752(1) and ζ(d=3)=0.357(1). For Gaussian disorder, the pinning force per site is estimated as f c= B m2m + f c0, where m2 is the strength of the confining potential, B a universal amplitude, m the correlation length of the disorder, and f c0 a non-universal lattice dependent term. For charge-density waves, we find a mapping to the standard φ4-theory with O(n) symmetry in the limit of n -2. This gives f c = A(d) m2 (m) + f c0 , with A(d) = -∂n [(d,n)-1+η(d,n)]n=-2, reminiscent of log-CFTs.

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