000			02133nam a22003257a 4500
008			131105b ck ||||| |||| 00| 0 spa d
020			_a0-201-58701-7
082	0	4	_a514.74 / C584c
245	1	0	_aClassics on fractals / Edited by Gerald A. Edgar
264			_aReading : Addison-Wesley, 1993
300			_a366 p.
490	0		_aStudies in nonlinearity _998719
505	0	0	_aOn continuous function of a real argument that do not have a well-defined differential quotient / Karl
505	0	0	_aWeierstrass -- On the powe of perfect sets of points / Georg Cantor -- On a continuous curve without tangent
505	0	0	_aconstructible from elementary geometry / Helge von Koch -- On the linear measure of point sets-a
505	0	0	_ageneralization of the concept of length / Constantin Carathéodory -- Dimension and outer measure / Felix
505	0	0	_aHausdorff -- General spaces and cartesian spaces / Karl Menger -- Improper sets and dimension numbers
505	0	0	_a(excerpt) / Georges Bouligand -- On a metric property of dimension / L. Pontrjagin -- On the sum of digits of
505	0	0	_areal numbers represented in the dyadic system / A. S. Besicovitch -- On a rational approximations to real
505	0	0	_anumbers / A. S. Besicovitch -- On dimensional numbers of some continuous curves / A. S. Besicovitch -- Plane
505	0	0	_aor space curves and surfaces consisting of parts similar to the wole / Paul Lévy -- Additive functions of
505	0	0	_aintervals and hausdorff measure / P.A.P Moran -- The dimension of cartesian product sets / J. M. Marstrand --
505	0	0	_aOn the complementary intervals of a linear closed set of zero lebesgue measure / A.S. Besicovitch -- On some
505	0	0	_acurves defined by functional equations / George de Rham -- A simple example of a function which is everywhere
505	0	0	_acontinuous and nowhere differentiable / Karl Kiesswetter -- How long in the coast of Britain? Statical
505	0	0	_aself-similarity and fractional dimension / Benoit Mandelbrot
650	1	4	_aFractales _9111115
650	1	4	_aMatematicas _9115749
700	1		_aEdgar, Gerald A. _eeditor _941199
999			_c2006 _d2006