We present various results concerning the two-weight Hardy inequality on infinite trees. Our main aim is to survey known characterizations (and proofs) for trace measures, as well as to provide some new ones. Also for some of the known characterizations we provide here new proofs. In particular, we obtain a new characterization in terms of a reverse Hölder inequality for trace measures, and one based on the well-known Muckenhoupt–Wheeden–Wolff inequality, of which we here give a new probabilistic proof. We provide a new direct proof for the so-called isocapacitary characterization and a new simple proof, based on a monotonicity argument, for the so-called mass-energy characterization. Furthermore, we introduce a conformally invariant version of the two-weight Hardy inequality, characterize the compactness of the Hardy operator, provide a list of open problems, and suggest some possible lines of future research.

Arcozzi, N., Chalmoukis, N., Levi, M., Mozolyako, P. (2023). Two-weight dyadic Hardy inequalities. ATTI DELLA ACCADEMIA NAZIONALE DEI LINCEI. RENDICONTI LINCEI. MATEMATICA E APPLICAZIONI, 34(3), 657-714 [10.4171/RLM/1023].

Two-weight dyadic Hardy inequalities

Chalmoukis, N
;
2023

Abstract

We present various results concerning the two-weight Hardy inequality on infinite trees. Our main aim is to survey known characterizations (and proofs) for trace measures, as well as to provide some new ones. Also for some of the known characterizations we provide here new proofs. In particular, we obtain a new characterization in terms of a reverse Hölder inequality for trace measures, and one based on the well-known Muckenhoupt–Wheeden–Wolff inequality, of which we here give a new probabilistic proof. We provide a new direct proof for the so-called isocapacitary characterization and a new simple proof, based on a monotonicity argument, for the so-called mass-energy characterization. Furthermore, we introduce a conformally invariant version of the two-weight Hardy inequality, characterize the compactness of the Hardy operator, provide a list of open problems, and suggest some possible lines of future research.
Articolo in rivista - Articolo scientifico
Bellman function; Besov spaces; Carleson measures; Dirichlet space; Hardy operator; maximal function; Muckenhoupt–Wheeden inequality; Potential theory on trees; reverse Hölder inequality; Wolff’s inequality;
English
4-dic-2023
2023
34
3
657
714
open
Arcozzi, N., Chalmoukis, N., Levi, M., Mozolyako, P. (2023). Two-weight dyadic Hardy inequalities. ATTI DELLA ACCADEMIA NAZIONALE DEI LINCEI. RENDICONTI LINCEI. MATEMATICA E APPLICAZIONI, 34(3), 657-714 [10.4171/RLM/1023].
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Utilizza questo identificativo per citare o creare un link a questo documento: https://hdl.handle.net/10281/478461
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