[1] Falconer K J. Random fractals. Math Proc Comb Philos Soc, 1996, 100: 559-582
[2] Falconer K J. The Hausdorff dimension of self-affine fractals. Math Proc Comb Phil Soc, 1988, 103:
339-359
[3] Falconer K J. The dimension of self-affine fractals II. Math Proc Comb Soc, 1992, 111: 169-179
[4] Falconer K J. Sub-self-similar sets. Tran Amer Math Soc, 1995, 347: 3121-3129
[5] Graf S. Statistically self-similar fractals. Prob The Rel Fields, 1987, 74: 357-392
[6] Graf S, Mauldin R D, Williams S C. The exact Huasdorff dimensin in random recursive contructions.
Memories of the Amer Math Soc, 1988, 71(381): 1-121
[7] Gatzouras D, Lalley S P. Hausdorff and box dimensions of certain self-affine fractals. Indiana University
Math J, 1992, 41: 533-568
[8] Gatzouras D, Lalley S P. Statistically self-affine sets:Hausdorff and Boxing dimension. J of The Prob,
1994, 7: 437-468
[9] Hutchinson J E. Fractals and self-similarity. Indiana Univ Math J, 1981, 30: 713-747
[10] Hu D H. Probability properties and fractal properties of statistically recursive sets. Science in China, 2001,
44(1): 1-21
[11] Mauldin R D, Williams S C. Random recursive constructions: asymptotic geometric and topological
properties. Trans Amer Math Soc, 1986, 295: 325-346
[12] Mauldin R D, Williams S C. Hausdorff dimension in graph directed constructions. Tran Amer Math Soc,
1988, 309: 811-829
[13] Mauldin R D, Urbanski M. Dimension and measures in infinite iterated function systems. Proc Lon Math
Soc, 1996, 3: 105-154
[14] Mcmullen C. The Hausdorff dimension of general Sirpinski Carpets. Nagoya Math J, 1984, 96: 1-9
[15] Schief A. Separation properties for self-similar sets. Proc Amer Math Soc, 1994, 122: 111-115
[16] Yu Jinghu. The estimate on the Hausdorff dimension of μ-statistically self-affine fractals(in Chinese). The
Chinese Annals of Mathematics, 1999, 20A(2): 203-212
[17] Yu Jinghu, Fan Wentao. Fractal properties of statistically self-similar sets. Acta Math Sci, 2000, 20(2):
256-260
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