Physics
Scientific paper
Feb 1991
adsabs.harvard.edu/cgi-bin/nph-data_query?bibcode=1991phrvl..66..978l&link_type=abstract
Physical Review Letters (ISSN 0031-9007), vol. 66, Feb. 25, 1991, p. 978-981. Research sponsored by NASA, DOE, and U.S. Navy.
Physics
75
Fractals, Lebesgue Theorem, Scattering, Hyperbolic Functions, Set Theory, Time Lag
Scientific paper
In chaotic scattering there is a Cantor set of input-variable values of zero Lebesgue measure (i.e., zero total length) on which the scattering function is singular. For cases where the dynamics leading to chaotic scattering is nonhyperbolic (e.g., there are Kolmogorov-Arnol'd-Moser tori), the nature of this singular set is fundamentally different from that in the hyperbolic case. In particular, for the nonhyperbolic case, although the singular set has zero total length, strong evidence is presented to show that its fractal dimension is 1.
Finn John M.
Lau Yun-Tung
Ott Edward
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