We prove the self-improvement property of the Hardy--Littlewood maximal operator on quasi-Banach lattices with the Fatou property in the setting of spaces of homogeneous type. Our result is a generalization of the boundedness criterion obtained in 2010 by Lerner and Ombrosi for maximal operators on quasi-Banach function spaces over Euclidean spaces. The specialty of the proof for spaces of homogeneous type lies in using adjacent grids of Hyt\"onen--Kairema dyadic cubes and studying the maximal operator alongside its dyadic version. Then we apply the obtained result to variable Lebesgue spaces over spaces of homogeneous type.
Weighted norm inequalities for the maximal operator on $\Lpp$ over spaces of homogeneous type
A note on boundedness of the Hardy-Littlewood maximal operator on Morrey spaces
A new quantitative two weight theorem for the Hardy-Littlewood maximal operator
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