Displaying similar documents to “On the covering by small random intervals”

Heat kernel for random walk trace on ℤ3 and ℤ4

Daisuke Shiraishi (2010)

Annales de l'I.H.P. Probabilités et statistiques

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We study the simple random walk on the range of simple random walk on ℤ3 and ℤ4. In dimension four, we establish quenched bounds for the heat kernel of and max0≤≤| | which require extra logarithmic correction terms to the higher-dimensional case. In dimension three, we demonstrate anomalous behavior of at the quenched level. In order to establish these estimates, we obtain several asymptotic estimates for cut times of simple random walk and asymptotic estimates for...

On an interval-partitioning scheme

Marcel Neuts, Jian-Min Li, Charles Pearce (1999)

Applicationes Mathematicae

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In a recent paper, Neuts, Rauschenberg and Li [10] examined, by computer experimentation, four different procedures to randomly partition the interval [0,1] into m intervals. The present paper presents some new theoretical results on one of the partitioning schemes. That scheme is called Random Interval (RI); it starts with a first random point in [0,1] and places the kth point at random in a subinterval randomly picked from the current k subintervals (1