Asymptotically Universal Crossover in Perturbation Theory with a Field Cutoff
Abstract
We discuss the crossover between the small and large field cutoff (denoted xmax) limits of the perturbative coefficients for a simple integral and the anharmonic oscillator. We show that in the limit where the order k of the perturbative coefficient ak(xmax) becomes large and for xmax in the crossover region, ak(xmax) is proportional to the integral from -infinity to xmax of e-A(x-x0(k))2dx. The constant A and the function x0(k) are determined empirically and compared with exact (for the integral) and approximate (for the anharmonic oscillator) calculations. We discuss how this approach could be relevant for the question of interpolation between renormalization group fixed points.
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