Estimates for Littlewood–Paley Operators on Ball Campanato-Type Function Spaces

“…However, as was mentioned in Dafni et al, 14 the structure of JN p is largely a mystery and so does JN (p,q,s) 𝛼 (). For instance, even for some classical operators (such as the Hardy-Littlewood maximal operator, the Calderón-Zygmund operator, and the fractional integral), it is still unclear whether or not these operators are bounded on JN p () or JN (p,q,s) 𝛼 (); we refer the reader to earlier research 13,[16][17][18][19][20] for some related studies. The main purpose of this article is to investigate the John-Nirenberg-Campanato space from the point of view of the negative part 𝑓 − ∶= − min{𝑓 , 0} and to shed some light on the structure of John-Nirenberg-type spaces associated with both maximal functions and their commutators.…”

New John–Nirenberg–Campanato‐type spaces related to both maximal functions and their commutators

“…However, as was mentioned in Dafni et al, 14 the structure of JN p is largely a mystery and so does JN (p,q,s) 𝛼 (). For instance, even for some classical operators (such as the Hardy-Littlewood maximal operator, the Calderón-Zygmund operator, and the fractional integral), it is still unclear whether or not these operators are bounded on JN p () or JN (p,q,s) 𝛼 (); we refer the reader to earlier research 13,[16][17][18][19][20] for some related studies. The main purpose of this article is to investigate the John-Nirenberg-Campanato space from the point of view of the negative part 𝑓 − ∶= − min{𝑓 , 0} and to shed some light on the structure of John-Nirenberg-type spaces associated with both maximal functions and their commutators.…”

New John–Nirenberg–Campanato‐type spaces related to both maximal functions and their commutators

Localized special John–Nirenberg–Campanato spaces via congruent cubes with applications to boundedness of local Calderón–Zygmund singular integrals and fractional integrals