Weighted norm inequalities for the maximal operator on L^p(·) over spaces of homogeneous type

Kirjoittajat

  • David Cruz-Uribe, OFS The University of Alabama, Department of Mathematics
  • Jeremy Cummings The University of Alabama, Department of Mathematics

Avainsanat:

Variable Lebesgue spaces, maximal operator, two weights, spaces of homogeneous type

Abstrakti

Given a space of homogeneous type \((X,d,\mu)\), we prove strong-type weighted norm inequalities for the Hardy-Littlewood maximal operator over the variable exponent Lebesgue spaces \(L^{p(\cdot)}\). We prove that the variable Muckenhoupt condition \(A_{p(\cdot)}\) is necessary and sufficient for the strong type inequality if \(p(\cdot)\) satisfies log-Hölder continuity conditions and \(1 < p_- \leq p_+ < \infty\). Our results generalize to spaces of homogeneous type the analogous results in Euclidean space proved by Cruz-Uribe, Fiorenza and Neugebauer (2012).

 

Osasto
Articles

Julkaistu

2022-02-23

Viittaaminen

Cruz-Uribe, OFS, D., & Cummings, J. (2022). Weighted norm inequalities for the maximal operator on L^p(·) over spaces of homogeneous type. Annales Fennici Mathematici, 47(1), 457–488. https://doi.org/10.54330/afm.115059