Boundary conditions and universal finite-size scaling for the hierarchical ||4 model in dimensions 4 and higher

Abstract

We analyse and clarify the finite-size scaling of the weakly-coupled hierarchical n-component ||4 model for all integers n 1 in all dimensions d 4, for both free and periodic boundary conditions. For d>4, we prove that for a volume of size Rd with periodic boundary conditions the infinite-volume critical point is an effective finite-volume critical point, whereas for free boundary conditions the effective critical point is shifted smaller by an amount of order R-2. For both boundary conditions, the average field has the same non-Gaussian limit within a critical window of width R-d/2 around the effective critical point, and in that window we compute the universal scaling profile for the susceptibility. In contrast, and again for both boundary conditions, the average field has a massive Gaussian limit when above the effective critical point by an amount R-2. In particular, at the infinite-volume critical point the susceptibility scales as Rd/2 for periodic boundary conditions and as R2 for free boundary conditions. We identify a mass generation mechanism for free boundary conditions that is responsible for this distinction and which we believe has wider validity, in particular to Euclidean (non-hierarchical) models on Zd in dimensions d 4. For d=4 we prove a similar picture with logarithmic corrections. Our analysis is based on the rigorous renormalisation group method of Bauerschmidt, Brydges and Slade, which we improve and extend.