Quantitative JohnNirenberg inequalities at different scales
Abstract
We provide an abstract estimate of the form \[ \ff_{Q,\mu}\_{X \left(Q,\frac{\mathrm{d} \mu}{Y(Q)}\right)}\leq c(\mu,Y)\psi(X)\f\_{\mathrm{BMO}(\mathrm{d}\mu)} \] for all cubes $Q$ in $\mathbb{R}^n$ and every function $f\in \mathrm{BMO}(\mathrm{d}\mu)$, where $\mu$ is a doubling measure in $\mathbb{R}^n$, $Y$ is some positive functional defined on cubes, $\\cdot \_{X \left(Q,\frac{\mathrm{d} w}{w(Q)}\right)}$ is a sufficiently good quasinorm and $c(\mu,Y)$ and $\psi(X)$ are positive constants depending on $\mu$ and $Y$, and $X$, respectively. That abstract scheme allows us to recover the sharp estimate \[ \ff_{Q,\mu}\_{L^p \left(Q,\frac{\mathrm{d} \mu(x)}{\mu(Q)}\right)}\leq c(\mu)p\f\_{\mathrm{BMO}(\mathrm{d}\mu)}, \qquad p\geq1 \] for every cube $Q$ and every $f\in \mathrm{BMO}(\mathrm{d}\mu)$, which is known to be equivalent to the JohnNirenberg inequality, and also enables us to obtain quantitative counterparts when $L^p$ is replaced by suitable strong and weak Orlicz spaces and $L^{p(\cdot)}$ spaces. Besides the aforementioned results we also generalize Theorem 1.2 in [OPRRR20] to the setting of doubling measures and obtain a new characterization of Muckenhoupt's $A_\infty$ weights.
 Publication:

arXiv eprints
 Pub Date:
 October 2020
 arXiv:
 arXiv:2010.01221
 Bibcode:
 2020arXiv201001221M
 Keywords:

 Mathematics  Classical Analysis and ODEs