A new formula for the Lp norm

Abstract

Recently, Brezis, Van Schaftingen and the second author established a new formula for the W1,p norm of a function in C∞c(RN). The formula was obtained by replacing the Lp(R2N) norm in the Gagliardo semi-norm for Ws,p(RN) with a weak-Lp(R2N) quasi-norm and setting s = 1. This provides a characterization of such W1,p norms, which complements the celebrated Bourgain-Brezis-Mironescu (BBM) formula. In this paper, we obtain an analog for the case s = 0. In particular, we present a new formula for the Lp norm of any function in Lp(RN), which involves only the measures of suitable level sets, but no integration. This provides a characterization of the norm on Lp(RN), which complements a formula by Maz'ya and Shaposhnikova. As a result, by interpolation, we obtain a new embedding of the Triebel-Lizorkin space Fsp,2(RN) (i.e. the Bessel potential space (I-)-s/2 Lp(RN)), as well as its homogeneous counterpart Fsp,2(RN), for s ∈ (0,1), p ∈ (1,∞).