[1] Alleche B. Quelques résultats sur la consonance, les
multi-applications et la séquentialité. Th`ese de Doctorat (PhD)
mathématiques, Universitéde Rouen, 1996.
[2] Barnsley M. F. Fractals Everywhere. Academic Press, Boston,
5ème edition, 1993.
[3] Berger M. A Panoramic View of Riemannian Geometry. Springer,
France, 2002.
[4] Bourbaki N. Topologie générale Chapitres 1-4.
'Eléments de mathémtique. SpringerVerlag Berlin, 2007.
[5] Bouziad A. and Calbrix J. Théorie de la mesure et
l'intégration. Universitéde Rouen, 1993.
[6] Bronshtein I.N. Semendyayev K.A. Musiol G. et Muehlig H.
Handbook of Mathematics. Springer-Verlag Berlin, 5ème
edition, 2007.
[7] Engelking R. General Topology. Heldermann Verlag Berlin,
1989.
[8] Falconer K.J. The Geometry of Fractal Sets. Cambridge
University Press, Cambridge, 1985.
[9] Falconer K.J. Fractal Geometry. Mathematical Foundations and
Applications. Wiley, New York, 2ème edition, 1990.
[10] Gerald E. Measure, Topology, and Fractal Geometry.
Springer, 2ème edition, 2008.
[11] Helmberg G. Getting acquainted with fractals. Walter de
Gruyter, 2007.
[12] Henrikson J. Completeness and total boundedness of the
Hausdorff metric. 1999.
[13] Herbin R. et Gallouët T. Mesure et Integation.
Universitéde Provence, 2008.
[14] Hutchinson J. Fractals and self-similarity. Indiana Journal
of Mathematics 30, pages 713747, 1981.
[15] Julia G. M'emoire sur l'it'eration des fonctions
rationnelles. Journal de math'ematiques pures et appliqu'ees, 8(1) :p. 47-246,
1918.
[16] Mendivil F. et Vrscay E.R. La Torre D. Iterated function
systems on multifunctions. 2004.
[17] La Torre D. et Mendivil F. Iterated function systems on
multifunctions and inverse problems. 2004.
[18] Lajoie J. La g'eom'etrie fractale. Master's thesis,
Universit'e du Qu'ebec a` trois-rivi`eres, 2006.
[19] Mandelbrot B. B. Fractal aspects of the iteration of z
-+ Az(1 -- z) for complex A, z. Ann. N. Y. Acad. Sci., 357
:249-259, 1980.
[20] Mandelbrot B. B. The Fractal Geometry of Nature. Freeman,
San Francisco, 1982.
[21] Marian G. et Constantin P.N. Chaotic dynamical systems. An
introduction. University of Craiova, Universitaria Press, 2002.
[22] McMullen C. The Hausdorff dimension of general Sierpi'nski
carpets. Nagoya Math. J., 96,1-9, 1984.
[23] McMullen C. Area and Hausdorff dimension of Julia sets of
entire functions. Transaction of the American mathematical society, 300(1),
March 1987.
[24] Mitsuhiro S. The Hausdorff dimension of the boundary of the
Mandelbrot set and Julia sets. April 1991.
[25] Olivier B. et Michel Z. Quelques r'esultats sur la
dimension de Hausdorff des ensembles de Julia des polynàomes
quadratiques. Fundamenta mathematicae, 151, 1996.
[26] Olivier E. Les dimensions fractales. Master's thesis,
2006.
[27] Peter M. Fractal geometry. From self-similarity to Brownian
motion. Universit·at Kaiserslautern, 2000/2001.
[28] Rudin W. Principles of Mathematical Analysis. Dunod,
3`eme edition, 1976.
[29] Rudin W. Analyse r'eelle et complexe. Cours et exercices.
Dunod, 3`eme edition, 1987.
