Reverse inequalities for quasi-Riesz transform on the Vicsek cable system

Abstract

This work is devoted to the study of so-called ``reverse Riesz'' inequalities and suitable variants in the context of some fractal-like cable systems. It was already proved by L. Chen, T. Coulhon, J. Feneuil and the second author that, in the Vicsek cable system, the inequality 1/2fp ∇ fp is false for all p∈ [1,2). Following a recent joint paper by the two authors and M. Yang, we examine the validity of ``reverse quasi-Riesz'' inequalities, of the form γe-fp ∇ fp, in the (unbounded) Vicsek cable system, for p∈ (1,+∞) and γ>0. These reverse inequalities are strongly related to the problem of Lp boundedness of the operators ∇ e--, the so-called ``quasi-Riesz transforms'' (at infinity), introduced by L. Chen in her PhD thesis. Our main result is an almost complete characterization of the sets of γ∈ (0,1) and p∈ (1,+∞) such that the reverse quasi-Riesz inequality holds in the Vicsek cable system. It remains an open question to investigate reverse quasi-Riesz inequalities for other cable systems, or for manifolds built out of these.