[KSCI] Korea Science Citation Index Service

http://dx.doi.org/10.4134/CKMS.c180030

REGULARITIES OF MULTIFRACTAL HEWITT-STROMBERG MEASURES

Attia, Najmeddine (Department of Mathematics Faculty of Sciences of Monastir)
Selmi, Bilel (Department of Mathematics Faculty of Sciences of Monastir)

Publication Information

Communications of the Korean Mathematical Society / v.34, no.1, 2019 , pp. 213-230 More about this Journal

Abstract

We construct new metric outer measures (multifractal analogues of the Hewitt-Stromberg measure) $H^{q,t}_{\mu}$ and $P^{q,t}_{\mu}$ lying between the multifractal Hausdorff measure ${\mathcal{H}}^{q,t}_{\mu}$ and the multifractal packing measure ${\mathcal{P}}^{q,t}_{\mu}$ . We set up a necessary and sufficient condition for which multifractal Hausdorff and packing measures are equivalent to the new ones. Also, we focus our study on some regularities for these given measures. In particular, we try to formulate a new version of Olsen's density theorem when ${\mu}$ satisfies the doubling condition. As an application, we extend the density theorem given in [3].

Keywords

multifractal Hausdorff measure; multifractal packing measure; Hewitt-Stromberg measure; regularities; densities; doubling measures;

Citations & Related Records

Times Cited By KSCI : 1 (Citation Analysis)

Reference
Cited By KSCI

1	L. Olsen, Dimension inequalities of multifractal Hausdorff measures and multifractal packing measures, Math. Scand. 86 (2000), no. 1, 109-129. DOI
2	Y. B. Pesin, Dimension Theory in Dynamical Systems, Chicago Lectures in Mathematics, University of Chicago Press, Chicago, IL, 1997.
3	X. Saint Raymond and C. Tricot, Packing regularity of sets in n-space, Math. Proc. Cambridge Philos. Soc. 103 (1988), no. 1, 133-145. DOI
4	B. Selmi, On the strong regularity with the multifractal measures in a probability space, Preprint, 2017.
5	B. Selmi, Some results about the regularities of multifractal measures, Korean J. Math., To appear.
6	B. Selmi, Measure of relative multifractal exact dimensions, Advances and Applications in Mathematical Sciences, To appear.
7	S. J. Taylor and C. Tricot, Packing measure, and its evaluation for a Brownian path, Trans. Amer. Math. Soc. 288 (1985), no. 2, 679-699. DOI
8	S. J. Taylor and C. Tricot, The packing measure of rectifiable subsets of the plane, Math. Proc. Cambridge Philos. Soc. 99 (1986), no. 2, 285-296. DOI
9	O. Zindulka, Packing measures and dimensions on Cartesian products, Publ. Mat. 57 (2013), no. 2, 393-420. DOI
10	N. Attia, Relative multifractal spectrum, Commun. Korean Math. Soc. 33 (2018), no. 2, 459-471. DOI
11	N. Attia, B. Selmi, and C. Souissi, Some density results of relative multifractal analysis, Chaos Solitons Fractals 103 (2017), 1-11. DOI
12	H. K. Baek, Regularities of multifractal measures, Proc. Indian Acad. Sci. Math. Sci. 118 (2008), no. 2, 273-279. DOI
13	H. K. Baek and H. H. Lee, Regularity of d-measure, Acta Math. Hungar. 99 (2003), no. 1-2, 25-32. DOI
14	C. D. Cutler, The density theorem and Hausdorff inequality for packing measure in general metric spaces, Illinois J. Math. 39 (1995), no. 4, 676-694. DOI
15	G. A. Edgar, Integral, Probability, and Fractal Measures, Springer-Verlag, New York, 1998.
16	G. A. Edgar, Centered densities and fractal measures, New York J. Math. 13 (2007), 33-87.
17	S. Jurina, N. MacGregor, A. Mitchell, L. Olsen, and A. Stylianou, On the Hausdorff and packing measures of typical compact metric spaces, Aequationes Math. 92 (2018), no. 4, 709-735. DOI
18	H. Haase, A contribution to measure and dimension of metric spaces, Math. Nachr. 124 (1985), 45-55. DOI
19	H. Haase, Open-invariant measures and the covering number of sets, Math. Nachr. 134 (1987), 295-307. DOI
20	E. Hewitt and K. Stromberg, Real and Abstract Analysis. A modern treatment of the theory of functions of a real variable, Springer-Verlag, New York, 1965.
21	H. H. Lee and I. S. Baek, The relations of Hausdorff, *-Hausdorff, and packing measures, Real Anal. Exchange 16 (1990/91), no. 2, 497-507. DOI
22	H. H. Lee and I. S. Baek, On d-measure and d-dimension, Real Anal. Exchange 17 (1991/92), no. 2, 590-596. DOI
23	H. H. Lee and I. S. Baek, The relations of Hausdorff, *-Hausdorff, and packing measures, Real Anal. Exchange 16 (1990/91), no. 2, 497-507. DOI
24	P. Mattila, Geometry of sets and Measures in Euclidian Spaces: Fractals and Rectifiabilitys, Cambridge University Press, Cambridge, 1995.
25	P. Mattila, The Geometry of Sets and Measures in Euclidean Spaces, Cambridge University Press, Cambridge, 1995.
26	P. Mattila and R. D. Mauldin, Measure and dimension functions: measurability and densities, Math. Proc. Cambridge Philos. Soc. 121 (1997), no. 1, 81-100. DOI
27	A. P. Morse and J. F. Randolph, The ${\phi}$ rectifiable subsets of the plane, Trans. Amer. Math. Soc. 55 (1944), 236-305. DOI
28	K. Falconer, Fractal Geometry, second edition, John Wiley & Sons, Inc., Hoboken, NJ, 2003.
29	L. Olsen, A multifractal formalism, Adv. Math. 116 (1995), no. 1, 82-196. DOI