M. Arbeiter and N. Patzschke, Random Self-Similar Multifractals, Mathematische Nachrichten, vol.80, issue.1, pp.5-42, 1996.
DOI : 10.1002/mana.3211810102

A. Besicovitch and S. Taylor, On the Complementary Intervals of a Linear Closed Set of Zero Lebesgue Measure, Journal of the London Mathematical Society, vol.1, issue.4, pp.449-459, 1954.
DOI : 10.1112/jlms/s1-29.4.449

G. Brown, G. Michon, and J. Peyrì-ere, On the multifractal analysis of measures, Journal of Statistical Physics, vol.59, issue.2, pp.3-4775, 1992.
DOI : 10.1007/BF01055700

C. Cabrelli, F. Mendivil, U. Molter, and R. , Shonkwiler On the Hausdorff h- Measure of Cantor Sets Pacific, Journal of Mathematics, vol.217, issue.1, pp.45-59, 2004.

R. S. Ellis, Large Deviations for a General Class of Random Vectors, The Annals of Probability, vol.12, issue.1, pp.1-12, 1984.
DOI : 10.1214/aop/1176993370

K. E. Ellis, M. L. Lapidus, M. C. Mackenzie, and J. A. Rock, Partition zeta functions, multifractal spectra, and tapestries of complex dimensions, 2010.
DOI : 10.1142/9789814366076_0012

K. Falconer, Fractal Geometry: Mathematical Foundations and Applications., Biometrics, vol.46, issue.3, 2003.
DOI : 10.2307/2532125

K. Falconer, Techniques in Fractal Geometry, 1997.

D. Gatzouras, Lacunarity of self-similar and stochastically self-similar sets, Transactions of the American Mathematical Society, vol.352, issue.05, pp.1953-1983, 2000.
DOI : 10.1090/S0002-9947-99-02539-8

B. M. Hambly and M. L. Lapidus, Random fractal strings: Their zeta functions, complex dimensions and spectral asymptotics, Transactions of the American Mathematical Society, vol.358, issue.1, pp.358-285, 2006.
DOI : 10.1090/S0002-9947-05-03646-9
URL : http://citeseerx.ist.psu.edu/viewdoc/summary?doi=10.1.1.154.1995

J. Hawkes, RANDOM RE-ORDERINGS OF INTERVALS COMPLEMENTARY TO A LINEAR SET, The Quarterly Journal of Mathematics, vol.35, issue.2, p.1650172, 1984.
DOI : 10.1093/qmath/35.2.165

C. Q. He and M. L. Lapidus, Generalized Minkowski content, spectrum of fractal drums, fractal strings and the Riemann zeta-function, Memoirs Amer, Math. Soc, vol.608, issue.197, p.127, 1997.

S. P. Lalley, The packing and covering functions of some self-similar fractals, Math. J, vol.37, p.699709, 1988.

M. L. Lapidus, Fractal drum, inverse spectral problems for elliptic operators and a partial resolution of the Weyl-Berry conjecture, Transactions of the American Mathematical Society, vol.325, issue.2, pp.325-465529, 1991.
DOI : 10.1090/S0002-9947-1991-0994168-5

M. L. Lapidus, Spectral and Fractal Geometry: From the Weyl-Berry Conjecture for the Vibrations of Fractal Drums to the Riemann Zeta-Function, Differential Equations and Mathematical Physics Proc. Fourth UAB Internat. Conf. (Birmingham, p.151182, 1990.
DOI : 10.1016/S0076-5392(08)63379-2

M. L. Lapidus, Vibrations of fractal drums, the Riemann hypothesis, waves in fractal media, and the Weyl-Berry conjecture, in: Ordinary and Partial Differential Equations, Proc. Twelfth Internat. Conf. Pitman Research Notes in Math. Series, p.126209, 1992.

M. L. Lapidus, FRACTALS AND VIBRATIONS: CAN YOU HEAR THE SHAPE OF A FRACTAL DRUM?, 725736. (Special issue in honor of Benoit B. Mandelbrot's 70th birthday, 1995.
DOI : 10.1142/S0218348X95000643

M. L. Lapidus, M. Van-frankenhuijsen, and F. Geometry, Complex Dimensions and Zeta Functions: Geometry and Spectra of Fractal Strings, 2006.

M. L. Lapidus and M. Van-frankenhuijsen, A prime orbit theorem for self-similar flows and Diophantine approximation, Contemporary Mathematics, vol.290, p.113138, 2001.
DOI : 10.1090/conm/290/04577

M. L. Lapidus and M. Van-frankenhuijsen, Complex dimensions of selfsimilar fractal strings and Diophantine approximation, J. Experimental Mathematics, issue.1, pp.42-4369, 2003.

M. L. Lapidus, J. Lévy, J. A. Véhel, and . Rock, Fractal strings and multifractal zeta functions, Letters in Mathematical Physics (special issue dedicated to Moshe Flato), 2009, in press. (e-print: ArXiv:math- ph, 610015.

M. L. Lapidus and H. Maier, The Riemann Hypothesis and Inverse Spectral Problems for Fractal Strings, Journal of the London Mathematical Society, vol.52, issue.1, pp.52-1534, 1995.
DOI : 10.1112/jlms/52.1.15

M. L. Lapidus and E. P. Pearse, A TUBE FORMULA FOR THE KOCH SNOWFLAKE CURVE, WITH APPLICATIONS TO COMPLEX DIMENSIONS, Journal of the London Mathematical Society, vol.74, issue.02, pp.74-397, 2006.
DOI : 10.1112/S0024610706022988

M. L. Lapidus and E. P. Pearse, Tube formulas and complex dimensions of self-similar tilings, to appear in, Acta Appl. Math

M. L. Lapidus and C. Pomerance, The Riemann Zeta-Function and the One-Dimensional Weyl-Berry Conjecture for Fractal Drums, Proc. London Math. Soc. (3), pp.66-4169, 1993.
DOI : 10.1112/plms/s3-66.1.41

M. L. Lapidus and C. Pomerance, Counterexamples to the modified Weyl???Berry conjecture on fractal drums, Mathematical Proceedings of the Cambridge Philosophical Society, vol.310, issue.01, p.167178, 1996.
DOI : 10.2307/2001638

M. L. Lapidus and J. A. Rock, Toward zeta functions and complex dimensions of mutlifractals, Complex Variables and Elliptic Equations (special issue dedicated to, pp.54-545, 2009.

K. S. Lau and S. M. Ngai, L q spectrum of the Bernouilli convolution associated with the golden ration, Studia Math, vol.131, issue.3, pp.225-251, 1998.

J. , L. Véhel, and C. Tricot, On various multifractal spectra, Fractal Geometry and Stochastics III, pp.23-42, 2004.

J. , L. Véhel, and R. Vojak, Multifractal analysis of Choquet capacities, Adv. in Appl. Math, vol.20, issue.1, pp.1-43, 1998.

B. B. Mandelbrot, Intermittent turbulence in self-similar cascades: divergence of high moments and dimension of the carrier, Journal of Fluid Mechanics, vol.15, issue.02, pp.331-358, 1974.
DOI : 10.1063/1.1693226

J. R. Rock, Zeta functions, complex dimensions of fractal strings and multifractal analysis of mass distributions, 2007.