...l geometry, complex dimensions and zeta functions. Geometry and spectra of fractal strings | series=Springer Monographs in Mathematics | location=New York, NY
19 KB (2,927 words) - 12:14, 5 November 2016
real ratio=horn_end.z/(-horn_start.y); // fractal levels ratio
11 KB (1,534 words) - 20:14, 12 December 2014
of a strange attractor is a fractal number related to the [[Hausdorff dimension|Hausdorff dimension]]. J.L. Kap
12 KB (1,746 words) - 15:37, 1 May 2023
|valign="top"|{{Ref|Fa}}|| K.J. Falconer, "The geometry of fractal sets" , Cambridge Univ. Press (1985) {{MR|0867284}} {{ZBL|0587.28004}}
10 KB (1,546 words) - 09:43, 16 August 2013
|valign="top"|{{Ref|Fa}}|| K. J. Falconer. "The geometry of fractal sets". Cambridge Tracts in Mathematics, 85. Cambridge University Press, Cam
12 KB (1,962 words) - 17:00, 13 June 2020
|valign="top"|{{Ref|Fa}}|| K. J. Falconer. "The geometry of fractal sets". Cambridge Tracts in Mathematics, 85. Cambridge University Press, Ca
|valign="top"|{{Ref|Fa2}}|| K. J. Falconer. "Fractal Geometry: Mathematical Foundations and Applications". John Wiley & Sons, 20
24 KB (3,616 words) - 14:54, 20 August 2013
For still other notions of dimension cf. also [[Fractal dimension|Fractal dimension]] and [[Hausdorff dimension|Hausdorff dimension]].
38 KB (5,928 words) - 19:35, 5 June 2020
dimensional Navier–Stokes equations and upper bounds for the fractal dimension of bounded invariant sets for the $ 3 $-
23 KB (3,271 words) - 08:02, 6 June 2020
...position of this topic. In [[#References|[a6]]] methods for estimating the fractal dimension of the attractor are given.
21 KB (3,004 words) - 08:26, 6 June 2020
...te number of determining modes, and a compact global attractor with finite fractal and [[Hausdorff dimension|Hausdorff dimension]]. While the attractor can ha
21 KB (3,050 words) - 17:43, 1 July 2020
In [[mathematics]], in the study of [[fractal]]s, a '''Hutchinson operator''' is a collection of functions on an underlyi
21 KB (3,255 words) - 17:39, 6 November 2016