Quantum corrections from a path integral over reparametrizations

We study the path integral over reparametrizations that has been proposed as an ansatz for the Wilson loops in the large-N QCD and reproduces the area law in the classical limit of large loops. We show that a semiclassical expansion for a rectangular loop captures the Luscher term associated with d = 26 dimensions and propose a modification of the ansatz that reproduces the Luscher term in other dimensions, which is observed in lattice QCD. We repeat the calculation for an outstretched ellipse advocating the emergence of an analog of the Luscher term and verify this result by a direct computation of the determinant of the Laplace operator and the conformal anomaly.