机读格式显示(MARC)
- 000 01429cam a2200313 a 4500
- 008 970821s1998 riua b 001 0 eng
- 020 __ |a 0821806858 (acid-free paper)
- 040 __ |a DLC |c DLC |d DLC
- 050 00 |a QA403.3 |b .W434 1998
- 082 00 |a 515/.2433 |2 21
- 099 __ |a CAL 022000354977
- 100 1_ |a Meyer, Yves, |d 1939-
- 245 10 |a Wavelets, vibrations, and scalings / |c Yves Meyer.
- 260 __ |a Providence, R.I., USA : |b American Mathematical Society, |c c1998.
- 300 __ |a ix, 133 p. : |b ill. ; |c 26 cm.
- 440 _0 |a CRM monograph series, |x 1065-8599 ; |v v. 9
- 504 __ |a Includes bibliographical references (p. 127-128) and index.
- 520 __ |a Physicists and mathematicians are intensely studying fractal sets of fractal curves. Mandelbrot advocated modeling of real-life signals by fractal or multifractal functions. One example is fractional Brownian motion, where large-scale behavior is related to a corresponding infrared divergence. Self-similarities and scaling laws play a key role in this new area.</P> <P>There is a widely accepted belief that wavelet analysis should provide the best available tool to unveil such scaling laws.
- 650 _0 |a Wavelets (Mathematics)
- 650 _0 |a Microlocal analysis.
- 950 __ |a JHUL |b O17 |c M613