Generalised Gagliardo-Nirenberg inequalities using weak Lebesgue spaces and BMO

Abstract

Using elementary arguments based on the Fourier transform we prove that for 1 ≤ q < p < ∞ and s ≥ 0 with s > n(1/2-1/p), if f ∈ Lq,∞(n) Hs(n) then f ∈ Lp(n) and there exists a constant cp,q,s such that \[ \|f\|Lp ≤ cp,q,s \|f\|Lq,∞θ \|f\| Hs1-θ, \] where 1/p = θ/q + (1-θ)(1/2-s/n). In particular, in 2 we obtain the generalised Ladyzhenskaya inequality \|f\|L4 c\|f\|L2,∞1/2\|f\| H11/2. We also show that for s=n/2 the norm in \|f\| Hn/2 can be replaced by the norm in BMO. As well as giving relatively simple proofs of these inequalities, this paper provides a brief primer of some basic concepts in harmonic analysis, including weak spaces, the Fourier transform, the Lebesgue Differentiation Theorem, and Calderon-Zygmund decompositions.