Quadratic maps with maximal oscillation

Hofbauer F, Keller G (1995)

Publication Type: Book chapter / Article in edited volumes

Publication year: 1995

Publisher: Plenum, New York

Edited Volumes: Algorithms, fractals, and dynamics (Okayama/Kyoto, 1992)

Pages Range: 89--94

DOI: 10.1007/978-1-4613-0321-3_7

Abstract

Let (f t )o≤t≤1 denote the family of quadratic maps f t(x) = 2t(1- x 2) - 1 on [-1, 1]. An important aspect of the asymptotics of interates of a map f t is the behaviour of mass distributions along individual orbits.

Authors with CRIS profile

Gerhard Keller Professur für Angewandte Mathematik (Angewandte Analysis)

Involved external institutions

Universität Wien / University of Vienna AT Austria (AT)

How to cite

APA:

Hofbauer, F., & Keller, G. (1995). Quadratic maps with maximal oscillation. In Y. Takahashi (Eds.), Algorithms, fractals, and dynamics (Okayama/Kyoto, 1992). (pp. 89--94). Plenum, New York.

MLA:

Hofbauer, Franz, and Gerhard Keller. "Quadratic maps with maximal oscillation." Algorithms, fractals, and dynamics (Okayama/Kyoto, 1992). Ed. Y. Takahashi, Plenum, New York, 1995. 89--94.

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