Duality for $A_\infty$ weights on the real line

Luigi D'Onofrio; Arturo Popoli; Roberta Schiattarella

doi:10.4171/rlm/735

JournalsrlmVol. 27, No. 3pp. 287–308

Duality for $A_{\infty}$ weights on the real line

Luigi D'Onofrio
Università degli Studi di Napoli Parthenope, Italy
Arturo Popoli
Università degli Studi di Napoli Federico II, Italy
Roberta Schiattarella
Università degli Studi di Napoli Federico II, Italy

$Duality for $A_\infty$ weights on the real line cover$

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Abstract

Under the same bounds on $G_{q}$ -constants and $A_{p}$ -constants, the optimal exponents for sharp inclusions between Gehring $G_{q}$ -class of weights and Muckenhoupt $A_{p}$ -class ( $1 < p, q < \infty$ ) are Hölder conjugate, if $p$ and $q$ are conjugate. This is a consequence of a representation theorem of $A_{\infty}$ weights in terms of $W^{1, r}$ -biSobolev maps and a duality result between $G_{q}$ and $A_{p}$ classes in dimension one. We prove also that sharp a priori bounds on constants correspond under the Hölder conjugate mapping $ϕ (t) = \frac{t}{t - 1}$ .

Cite this article

Luigi D'Onofrio, Arturo Popoli, Roberta Schiattarella, Duality for $A_{\infty}$ weights on the real line. Atti Accad. Naz. Lincei Cl. Sci. Fis. Mat. Natur. 27 (2016), no. 3, pp. 287–308

DOI 10.4171/RLM/735