Crossref Citations
This article has been cited by the following publications. This list is generated based on data provided by Crossref.
Thaler, M.
and
Zweimüller, R.
2006.
Distributional limit theorems in infinite ergodic theory.
Probability Theory and Related Fields,
Vol. 135,
Issue. 1,
p.
15.
Zweimüller, Roland
2007.
Infinite measure preserving transformations with compact first regeneration.
Journal d'Analyse Mathématique,
Vol. 103,
Issue. 1,
p.
93.
Korabel, Nickolay
Klages, Rainer
Chechkin, Aleksei V.
Sokolov, Igor M.
and
Gonchar, Vsevolod Yu.
2007.
Fractal properties of anomalous diffusion in intermittent maps.
Physical Review E,
Vol. 75,
Issue. 3,
Akimoto, Takuma
2008.
Generalized Arcsine Law and Stable Law in an Infinite Measure Dynamical System.
Journal of Statistical Physics,
Vol. 132,
Issue. 1,
p.
171.
Barkai, Eli
2008.
Anomalous Transport.
p.
213.
Korabel, Nickolay
and
Barkai, Eli
2010.
Separation of trajectories and its relation to entropy for intermittent systems with a zero Lyapunov exponent.
Physical Review E,
Vol. 82,
Issue. 1,
Akimoto, Takuma
2012.
Distributional Response to Biases in Deterministic Superdiffusion.
Physical Review Letters,
Vol. 108,
Issue. 16,
Korabel, N.
and
Barkai, E.
2012.
Infinite Invariant Density Determines Statistics of Time Averages for Weak Chaos.
Physical Review Letters,
Vol. 108,
Issue. 6,
Korabel, Nickolay
and
Barkai, Eli
2013.
Numerical estimate of infinite invariant densities: application to Pesin-type identity.
Journal of Statistical Mechanics: Theory and Experiment,
Vol. 2013,
Issue. 08,
p.
P08010.
Korabel, Nickolay
and
Barkai, Eli
2013.
Distributions of time averages for weakly chaotic systems: The role of infinite invariant density.
Physical Review E,
Vol. 88,
Issue. 3,
Melbourne, Ian
and
Terhesiu, Dalia
2013.
First and higher order uniform dual ergodic theorems for dynamical systems with infinite measure.
Israel Journal of Mathematics,
Vol. 194,
Issue. 2,
p.
793.
Akimoto, Takuma
Shinkai, Soya
and
Aizawa, Yoji
2015.
Distributional Behavior of Time Averages of Non- $$L^1$$ L 1 Observables in One-dimensional Intermittent Maps with Infinite Invariant Measures.
Journal of Statistical Physics,
Vol. 158,
Issue. 2,
p.
476.
Akimoto, Takuma
Nakagawa, Masaki
Shinkai, Soya
and
Aizawa, Yoji
2015.
Generalized Lyapunov exponent as a unified characterization of dynamical instabilities.
Physical Review E,
Vol. 91,
Issue. 1,
Venegeroles, Roberto
2015.
Exact invariant measures: How the strength of measure settles the intensity of chaos.
Physical Review E,
Vol. 91,
Issue. 6,
Wang, Wanli
and
Deng, Weihua
2018.
Aging Feynman–Kac equation.
Journal of Physics A: Mathematical and Theoretical,
Vol. 51,
Issue. 1,
p.
015001.
Lenci, Marco
and
Munday, Sara
2018.
Pointwise convergence of Birkhoff averages for global observables.
Chaos: An Interdisciplinary Journal of Nonlinear Science,
Vol. 28,
Issue. 8,
Sera, Toru
and
Yano, Kouji
2019.
Multiray generalization of the arcsine laws for occupation times of infinite ergodic transformations.
Transactions of the American Mathematical Society,
Vol. 372,
Issue. 5,
p.
3191.
Akimoto, Takuma
Barkai, Eli
and
Radons, Günter
2020.
Infinite invariant density in a semi-Markov process with continuous state variables.
Physical Review E,
Vol. 101,
Issue. 5,
Sera, Toru
2020.
Functional limit theorem for occupation time processes of intermittent maps.
Nonlinearity,
Vol. 33,
Issue. 3,
p.
1183.
Akimoto, Takuma
Sera, Toru
Yamato, Kosuke
and
Yano, Kouji
2020.
Aging arcsine law in Brownian motion and its generalization.
Physical Review E,
Vol. 102,
Issue. 3,