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On approximate differentiability of the maximal function

Author(s): Piotr Hajłasz; Jan Maly
Journal: Proc. Amer. Math. Soc. 138 (2010), 165-174.
MSC (2000): Primary 42B25; Secondary 46E35, 31B05
Posted: September 3, 2009
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Abstract: We prove that if $ f\in L^1(\mathbb{R}^n)$ is approximately differentiable a.e., then the Hardy-Littlewood maximal function $ \mathcal{M}f$ is also approximately differentiable a.e. Moreover, if we only assume that $ f\in L^1(\mathbb{R}^n)$, then any open set of $ \mathbb{R}^n$ contains a subset of positive measure such that $ \mathcal{M} f$ is approximately differentiable on that set. On the other hand we present an example of $ f\in L^1(\mathbb{R})$ such that $ \mathcal{M}f$ is not approximately differentiable a.e.

References:

1.
Acerbi, E., Fusco, N.: An approximation lemma for $ W\sp {1,p}$ functions. In: Material instabilities in continuum mechanics (Edinburgh, 1985-1986), pp. 1-5, Oxford Sci. Publ., Oxford Univ. Press, New York, 1988. MR 970512 (89m:46060)

2.
Aldaz, J. M., Pérez Lázaro, J.: Boundedness and unboundedness results for some maximal operators on functions of bounded variation. J. Math. Anal. Appl. 337 (2008), 130-143. MR 2356061 (2008k:42050)

3.
Aldaz, J. M., Pérez Lázaro, J.: Functions of bounded variation, the derivative of the one dimensional maximal function, and applications to inequalities. Trans. Amer. Math. Soc. 359 (2007), 2443-2461. MR 2276629 (2008f:42010)

4.
Bojarski, B.: Remarks on some geometric properties of Sobolev mappings. In: Functional analysis & related topics (Sapporo, 1990), pp. 65-76, World Sci. Publ., River Edge, NJ, 1991. MR 1148607 (92k:46046)

5.
Bojarski, B., Hajłasz, P.: Pointwise inequalities for Sobolev functions and some applications. Studia Math. 106 (1993), 77-92. MR 1226425 (94h:46045)

6.
Buckley, S. M.: Is the maximal function of a Lipschitz function continuous? Ann. Acad. Sci. Fenn. Math. 24 (1999), 519-528. MR 1724375 (2001e:42025)

7.
Carneiro, E., Moreira, D.: On the regularity of maximal operators. Proc. Amer. Math. Soc. 136 (2008), 4395-4404. MR 2431055

8.
Hajłasz, P., Onninen, J.: On boundedness of maximal functions in Sobolev spaces. Ann. Acad. Sci. Fenn. Math. 29 (2004), 167-176. MR 2041705 (2005a:42010)

9.
Hayman, W. K., Kennedy, P. B.: Subharmonic functions. Vol. I. London Mathematical Society Monographs, No. 9. Academic Press, London-New York, 1976. MR 0460672 (57:665)

10.
Kinnunen, J.: The Hardy-Littlewood maximal function of a Sobolev function. Israel J. Math. 100 (1997), 117-124. MR 1469106 (99a:30029)

11.
Kinnunen, J., Latvala, V.: Lebesgue points for Sobolev functions on metric spaces. Rev. Mat. Iberoamericana 18 (2002), 685-700. MR 1954868 (2004c:46054)

12.
Kinnunen, J., Lindqvist, P.: The derivative of the maximal function. J. Reine Angew. Math. 503 (1998), 161-167. MR 1650343 (99j:42027)

13.
Kinnunen, J., Martio, O.: Maximal operator and superharmonicity. In: Function spaces, differential operators and nonlinear analysis (Pudasjärvi, 1999), pp. 157-169, Acad. Sci. Czech Repub., Prague, 2000. MR 1755307 (2001f:31005)

14.
Kinnunen, J., Saksman, E.: Regularity of the fractional maximal function. Bull. London Math. Soc. 35 (2003), 529-535. MR 1979008 (2004e:42035)

15.
Kinnunen, J., Tuominen, H.: Pointwise behaviour of $ M\sp {1,1}$ Sobolev functions. Math. Z. 257 (2007), 613-630. MR 2328816 (2008e:46042)

16.
Korry, S.: A class of bounded operators on Sobolev spaces. Arch. Math. (Basel) 82 (2004), 40-50. MR 2034469 (2004k:42033)

17.
Korry, S.: Extensions of Meyers-Ziemer results. Israel J. Math. 133 (2003), 357-367. MR 1968435 (2004c:46055)

18.
Korry, S.: Boundedness of Hardy-Littlewood maximal operator in the framework of Lizorkin-Triebel spaces. Rev. Mat. Complut. 15 (2002), 401-416. MR 1951818 (2004a:42020)

19.
Lindqvist, P.: On the definition and properties of $ p$-superharmonic functions. J. Reine Angew. Math. 365 (1986), 67-79. MR 826152 (87e:31011)

20.
Luiro, H.: Continuity of the maximal operator in Sobolev spaces. Proc. Amer. Math. Soc. 135 (2007), 243-251. MR 2280193 (2007i:42021)

21.
MacManus, P.: Poincaré inequalities and Sobolev spaces. In: Proceedings of the 6th International Conference on Harmonic Analysis and Partial Differential Equations (El Escorial, 2000). Publ. Mat. 2002, Vol. Extra, pp. 181-197. MR 1964820 (2004j:46049)

22.
Malý, J., Ziemer, W. P.: Fine regularity of solutions of elliptic partial differential equations. Mathematical Surveys and Monographs, 51. American Mathematical Society, Providence, RI, 1997. MR 1461542 (98h:35080)

23.
Ransford, T.: Potential theory in the complex plane. London Mathematical Society Student Texts, 28. Cambridge University Press, Cambridge, 1995. MR 1334766 (96e:31001)

24.
Stein, E. M.: Singular integrals and differentiability properties of functions. Princeton Mathematical Series, No. 30. Princeton University Press, Princeton, N.J., 1970. MR 0290095 (44:7280)

25.
Tanaka, H.: A remark on the derivative of the one-dimensional Hardy-Littlewood maximal function. Bull. Austral. Math. Soc. 65 (2002), 253-258. MR 1898539 (2002m:42017)

26.
Whitney, H.: On totally differentiable and smooth functions. Pacific J. Math. 1 (1951), 143-159. MR 0043878 (13:333d)

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Additional Information:

Piotr Hajłasz
Affiliation: Department of Mathematics, University of Pittsburgh, 301 Thackeray Hall, Pittsburgh, Pennsylvania 15260
Email: hajlasz@pitt.edu

Jan Maly
Affiliation: Department KMA of the Faculty of Mathematics and Physics, Charles University, Sokolovská 83, CZ-18675 Praha 8, Czech Republic - and - Department of Mathematics of the Faculty of Science, J. E. Purkyne University, Ceské mládeze 8, 400 96 Ústí nad Labem, Czech Republic
Email: maly@karlin.mff.cuni.cz

DOI: 10.1090/S0002-9939-09-09971-7
PII: S 0002-9939(09)09971-7
Received by editor(s): February 18, 2009
Posted: September 3, 2009
Additional Notes: The first author was supported by NSF grant DMS-0500966.
The second author was supported by the research project MSM 0021620839 and by grants GA CR 201/06/0198, 201/09/0067
Dedicated: Dedicated to Professor Bogdan Bojarski
Communicated by: Tatiana Toro
Copyright of article: Copyright 2009, American Mathematical Society
The copyright for this article reverts to public domain after 28 years from publication.

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