Hofbauer F, Keller G (1993)
Publication Type: Journal article, Original article
Publication year: 1993
Publisher: Wiley-VCH Verlag
Book Volume: 164
Pages Range: 239--257
Journal Issue: 1
For a class of piecewise monotone interval maps T (including unimodal maps with negative Schwarzian derivative) and real valued functions f of bounded variation we compare equilibrium states μ of f with Hausdorff measures v and give an integral test for the dichotomy μ ≪ v or μ ⊥ v. For certain classes of rational maps such a result was proved in [15] and [3].
APA:
Hofbauer, F., & Keller, G. (1993). Equilibrium states and Hausdorff measures for interval maps. Mathematische Nachrichten, 164(1), 239--257. https://doi.org/10.1002/mana.19931640117
MLA:
Hofbauer, Franz, and Gerhard Keller. "Equilibrium states and Hausdorff measures for interval maps." Mathematische Nachrichten 164.1 (1993): 239--257.
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