Reverse inequalities for super-Riesz transforms on graphs with a slow diffusion

Abstract

In the D-dimensional Vicsek graph, we prove that the Riesz-like inequality \|∇ f\|p ≤ C \|Δγf\|p holds for every p∈(1,∞) and every 0<γ<γ*(p):=1D+1+D-1D+1\,1p, while it fails whenever p∈(1,∞) and γ*(p)<γ<1. Thus, the validity of the inequality remains open only at the critical exponent γ=γ*(p). This provides the first example of an Lp-bounded ``super-Riesz transform'', namely an operator of the form ∇ Δ-γ with γ strictly larger than the Euclidean threshold 12. To achieve this, we establish a more general result linking the diffusion escape rate and a Poincaré inequality on balls to the validity of the reverse Riesz-like inequality \|Δγf\|p ≤ C \|∇ f\|p.