-
1
-
-
0025236024
-
Upper and lower bounds on the Renyi dimensions and the uniformity of multifractals
-
C. Beck. Upper and lower bounds on the Renyi dimensions and the uniformity of multifractals. Physica D 41 (1990), 67-78.
-
(1990)
Physica D
, vol.41
, pp. 67-78
-
-
Beck, C.1
-
2
-
-
0002140877
-
Hölder continuity for the inverse of Mañé's projection
-
A. Ben-Artzi, A. Eden, C. Foias and B. Nicolaenko. Hölder continuity for the inverse of Mañé's projection. J. Math. Anal Appl 178(1) (1993), 22-29.
-
(1993)
J. Math. Anal Appl
, vol.178
, Issue.1
, pp. 22-29
-
-
Ben-Artzi, A.1
Eden, A.2
Foias, C.3
Nicolaenko, B.4
-
6
-
-
21844493529
-
Projection theorems for box and packing dimensions
-
K. Falconer and J. D. Howroyd. Projection theorems for box and packing dimensions. Math. Proc. Cambridge Philos. Soc. 119(2) (1996), 287-295.
-
(1996)
Math. Proc. Cambridge Philos. Soc.
, vol.119
, Issue.2
, pp. 287-295
-
-
Falconer, K.1
Howroyd, J.D.2
-
7
-
-
0003169927
-
Finite fractal dimension and Hölder-Lipschitz parametrization
-
C. Foias and E. Olson. Finite fractal dimension and Hölder-Lipschitz parametrization. Indiana Univ. Math. J. 45(3) (1996), 603-616.
-
(1996)
Indiana Univ. Math. J.
, vol.45
, Issue.3
, pp. 603-616
-
-
Foias, C.1
Olson, E.2
-
8
-
-
0042044430
-
Smooth attractors have zero 'Thickness'
-
P. Friz and J. Robinson. Smooth attractors have zero 'Thickness'. J. Math. Anal. Appl. 240(1) (1999), 37-46.
-
(1999)
J. Math. Anal. Appl.
, vol.240
, Issue.1
, pp. 37-46
-
-
Friz, P.1
Robinson, J.2
-
9
-
-
0035997406
-
The Brunn-Minkowski Inequality
-
R. J. Gardner. The Brunn-Minkowski Inequality. Bull. Amer. Math. Soc. 39 (2002), 355-405.
-
(2002)
Bull. Amer. Math. Soc.
, vol.39
, pp. 355-405
-
-
Gardner, R.J.1
-
10
-
-
48749149528
-
Generalized dimension of strange attractors
-
P. Grassberger. Generalized dimension of strange attractors. Phys. Lett. 97A (1983), 227-231.
-
(1983)
Phys. Lett.
, vol.97 A
, pp. 227-231
-
-
Grassberger, P.1
-
11
-
-
0346372923
-
The infinite number of generalized dimensions of fractals and strange attractors
-
H. G. Hentschel and I. Procaccia. The infinite number of generalized dimensions of fractals and strange attractors. Physica D 8 (1983), 435-444.
-
(1983)
Physica D
, vol.8
, pp. 435-444
-
-
Hentschel, H.G.1
Procaccia, I.2
-
12
-
-
0001464903
-
How projections affect the dimension spectrum of fractal measures
-
B. Hunt and V. Kaloshin. How projections affect the dimension spectrum of fractal measures. Nonlinearity 10 (1997), 1031-1046.
-
(1997)
Nonlinearity
, vol.10
, pp. 1031-1046
-
-
Hunt, B.1
Kaloshin, V.2
-
13
-
-
0033196607
-
Regularity of embeddings of infinite-dimensional fractal sets into finite-dimensional spaces
-
B. Hunt and V. Kaloshin. Regularity of embeddings of infinite-dimensional fractal sets into finite-dimensional spaces. Nonlinearity 12 (1999), 1263-1275.
-
(1999)
Nonlinearity
, vol.12
, pp. 1263-1275
-
-
Hunt, B.1
Kaloshin, V.2
-
14
-
-
0037102695
-
SLYRB measures: Natural invariant measures for chaotic systems
-
B. Hunt, J. Kennedy, T. Y. Li and H. Nusse. SLYRB measures: natural invariant measures for chaotic systems. Physica D 170(1) (2002), 50-71.
-
(2002)
Physica D
, vol.170
, Issue.1
, pp. 50-71
-
-
Hunt, B.1
Kennedy, J.2
Li, T.Y.3
Nusse, H.4
-
15
-
-
84967728280
-
Prevalence: A translation-invariant 'almost every' on infinite-dimensional spaces
-
B. Hunt, T. Sauer and J. Yorke. Prevalence: a translation-invariant 'almost every' on infinite-dimensional spaces. Bull. Amer. Math. Soc. 27 (1992), 217-238.
-
(1992)
Bull. Amer. Math. Soc.
, vol.27
, pp. 217-238
-
-
Hunt, B.1
Sauer, T.2
Yorke, J.3
-
17
-
-
0002051531
-
On the upper Minkowski dimension, the packing dimension, and orthogonal projections
-
M. Järvenpää. On the upper Minkowski dimension, the packing dimension, and orthogonal projections. Ann. Acad. Sci. Fenn. Ser: AI Math. Dissertationes 99 (1994), 1-34.
-
(1994)
Ann. Acad. Sci. Fenn. Ser: AI Math. Dissertationes
, vol.99
, pp. 1-34
-
-
Järvenpää, M.1
-
18
-
-
0038507951
-
Some prevalent properties of smooth dynamical systems
-
V. Yu. Kaloshin. Some prevalent properties of smooth dynamical systems. Proc. Steklov Inst. Math. 213(2) (1996), 115-140.
-
(1996)
Proc. Steklov Inst. Math.
, vol.213
, Issue.2
, pp. 115-140
-
-
Kaloshin, V.Yu.1
-
19
-
-
84974040590
-
On Hausdorff dimension of projections
-
R. Kaufman. On Hausdorff dimension of projections. Mathematika IS (1968), 153-155.
-
(1968)
Mathematika
, vol.15
, pp. 153-155
-
-
Kaufman, R.1
-
20
-
-
84963103615
-
Some fundamental geometrical properties of plane sets of fractional dimension
-
J. M. Marstrand. Some fundamental geometrical properties of plane sets of fractional dimension. Proc. London Math. Soc. 4 (1954), 257-302.
-
(1954)
Proc. London Math. Soc.
, vol.4
, pp. 257-302
-
-
Marstrand, J.M.1
-
21
-
-
0000367680
-
Hausdorff dimension, orthogonal projections and intersections with planes
-
P. Mattila. Hausdorff dimension, orthogonal projections and intersections with planes. Ann. Acad. Sci. Fennicae A 1 (1975), 227-244.
-
(1975)
Ann. Acad. Sci. Fennicae A
, vol.1
, pp. 227-244
-
-
Mattila, P.1
-
25
-
-
58149362177
-
An improved multifractal formalism and self-affine measures
-
R. H. Riedi. An improved multifractal formalism and self-affine measures. J. Math, Anal. Appl. 189 (1995), 462-490.
-
(1995)
J. Math, Anal. Appl.
, vol.189
, pp. 462-490
-
-
Riedi, R.H.1
-
27
-
-
0031490957
-
Are the dimensions of a set and its image equal under typical smooth functions?
-
T. Sauer and J. Yorke. Are the dimensions of a set and its image equal under typical smooth functions? Ergod. Th. & Dynam. Sys. 17(4) (1997), 941-956.
-
(1997)
Ergod. Th. & Dynam. Sys.
, vol.17
, Issue.4
, pp. 941-956
-
-
Sauer, T.1
Yorke, J.2
-
30
-
-
0141450378
-
What are SRB measures, and which dynamical systems have them? Dedicated to David Ruelle and Yasha Sinai on the occasion of their 65th birthdays
-
L.-S. Young. What are SRB measures, and which dynamical systems have them? Dedicated to David Ruelle and Yasha Sinai on the occasion of their 65th birthdays. J. Stat. Phys. 108(5-6) (2002), 733-754.
-
(2002)
J. Stat. Phys.
, vol.108
, Issue.5-6
, pp. 733-754
-
-
Young, L.-S.1
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