Results 291 to 300 of about 702,219 (333)
Brains are Probabilistic, Electrophysiologically Intricate and Triune: A Biased- Random Walk Perspective on Computational Neuroscience. [PDF]
Int J Psychol Res (Medellin)Gómez-Molina JF.
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Node-degree aware edge sampling mitigates inflated classification performance in biomedical random walk-based graph representation learning. [PDF]
Bioinform AdvCappelletti L +16 more
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Some remarks on the recurrent sets for transient random walk
, 1973 Ishida Kenro
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International Journal of Theoretical Physics, 2022
zbMATH Open Web Interface contents unavailable due to conflicting licenses.
Anwar Zaman +3 more
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zbMATH Open Web Interface contents unavailable due to conflicting licenses.
Anwar Zaman +3 more
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Physica A: Statistical Mechanics and its Applications, 1982
The authors investigate the random walk of a particle on a one-dimensional chain which has been constructed by a random-walk procedure. Exact expressions are given for the mean-square displacement and the fourth moment after n steps. The probability density after n steps is derived in the saddle-point approximation, for large n.
K.W. Kehr, R. Kutner
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The authors investigate the random walk of a particle on a one-dimensional chain which has been constructed by a random-walk procedure. Exact expressions are given for the mean-square displacement and the fourth moment after n steps. The probability density after n steps is derived in the saddle-point approximation, for large n.
K.W. Kehr, R. Kutner
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Physical Review E, 1995
The fluctuations about the stable point in a delayed dynamical system are modeled as a delayed random walk: i.e., a random walk in which the transition probability depends on the position of the walker at a time \ensuremath{\tau} in the past and transitions in the direction of the stable point are more probable.
, Ohira, , Milton
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The fluctuations about the stable point in a delayed dynamical system are modeled as a delayed random walk: i.e., a random walk in which the transition probability depends on the position of the walker at a time \ensuremath{\tau} in the past and transitions in the direction of the stable point are more probable.
, Ohira, , Milton
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Physical Review A, 1993
We introduce the concept of quantum random walk, and show that due to quantum interference effects the average path length can be much larger than the maximum allowed path in the corresponding classical random walk. A quantum-optics application is described.
, Aharonov, , Davidovich, , Zagury
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We introduce the concept of quantum random walk, and show that due to quantum interference effects the average path length can be much larger than the maximum allowed path in the corresponding classical random walk. A quantum-optics application is described.
, Aharonov, , Davidovich, , Zagury
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The Review of Economic Studies, 1993
Summary: The paper examines, within the framework of a multi-dimensional one-step forward-looking model, a special category of rational expectations equilibria. Their support is infinite with two accumulation points (steady states); the stochastic motion of the system is of random-walk type.
Chiappori, Pierre-André +1 more
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Summary: The paper examines, within the framework of a multi-dimensional one-step forward-looking model, a special category of rational expectations equilibria. Their support is infinite with two accumulation points (steady states); the stochastic motion of the system is of random-walk type.
Chiappori, Pierre-André +1 more
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