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ЖУРНАЛЫ // Theory of Stochastic Processes // Архив

Theory Stoch. Process., 2020, том 25(41), выпуск 2, страницы 15–24 (Mi thsp315)

Loop-erased random walks associated with Markov processes

A. A. Dorogovtseva, I. I. Nishchenkob

a Institute of mathematics of the National Academy of Sciences of Ukraine
b National Technical University of Ukraine “Igor Sikorsky Kyiv Polytechnic Institute”

Аннотация: A new class of loop-erased random walks (LERW) on a finite set, defined as functionals from a Markov chain is presented. We propose a scheme in which, in contrast to the general settings of LERW, the loop-erasure is performed on a non-markovian sequence and moreover, not all loops are erased with necessity. We start with a special example of a random walk with loops, the number of which at every moment of time does not exceed a given fixed number. Further we consider loop-erased random walks, for which loops are erased at random moments of time that are hitting times for a Markov chain. The asymptotics of the normalized length of such loop-erased walks is established. We estimate also the speed of convergence of the normalized length of the loop-erased random walk on a finite group to the Rayleigh distribution.

Ключевые слова: loop-erased random walk, Ehrenfest model.

MSC: 60J10, 60J67

Язык публикации: английский



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