Best constants for a family of Carleson sequences

Abstract: Abstract. We consider a general family of Carleson sequences associated with dyadic A2 weights and find sharp -or, in one case, simply best known -upper and lower bounds for their Carleson norms in terms of the A2 -characteristic of the weight. The results obtained make precise and significantly generalize earlier estimates by Wittwer, Vasyunin, Beznosova, and others. We also record several corollaries, one of which is a range of new characterizations of dyadic A2. Particular emphasis is placed on the relation… Show more

“…For the corresponding "tail"-estimate on the Muckenhoupt classes see [23]. One can also apply very similar technique to estimate the norm of the maximal operator, see [15,28], and the Carleson embedding operator, see [40,26]. We refer the reader to the lecture notes [42,43] for a more detailed scenery of the subject.…”

Bellman function for extremal problems in $\mathrm{BMO}$ II: evolution

“…For the corresponding "tail"-estimate on the Muckenhoupt classes see [23]. One can also apply very similar technique to estimate the norm of the maximal operator, see [15,28], and the Carleson embedding operator, see [40,26]. We refer the reader to the lecture notes [42,43] for a more detailed scenery of the subject.…”

Bellman function for extremal problems in $\mathrm{BMO}$ II: evolution

“…Also in [33], using the Monge-Ampère equation approach, a more general Bellman function than the one related to the dyadic Carleson Imbedding Theorem has been precisely evaluated thus generalizing the corresponding result in [10]. For more recent developments we refer to [1,6,7,23,24,28,29,37]. Additional results can be found in [34,35] while for the study of general theory of maximal operators one can consult [4,5] and [30].…”

A multiparameter integral inequality for the dyadic maximal operator and applications

Local Lower Norm Estimates for Dyadic Maximal Operators and Related Bellman Functions