Add to ORKGWe examine distance record setting by a random walker in the presence of a measurement error δ and additive noise γ and show that the mean number of (upper) records up to n steps still grows universally as ⟨Rn⟩∼n1/2 for large n for all jump densities, including Lévy distributions, and for all δ and γ. In contrast, the pace of record setting, measured by the amplitude of the n1/2 growth, depends on δ and γ. In the absence of noise (γ=0), the amplitude S(δ) is evaluated explicitly for arbitrary jump distributions and it decreases monotonically with increasing δ whereas, in the case of perfect measurement (δ=0), the corresponding amplitude T(γ) increases with γ. The exact results for S(δ)offer a new perspective for characterizing instrumental ...
We address the theory of records for integrated random walks with finite variance. The long-time con...
Abstract.- The statistics of records for a time series generated by a continuous time random walk is...
We study the random walk X on the range of a simple random walk on ℤ d in dimensions d≥4. When d≥...
We examine distance record setting by a random walker in the presence of a measurement error δ and a...
64 pages, 14 figures. Topical review, submitted for publication in J. Phys. AWe review recent advanc...
The deviation principles of record numbers in random walk models have not been completely investigat...
30 pages, 9 figures. Revised (and published) version. To appear in J. Phys. AInternational audienceW...
6 pages + 5 pages of supplemental material, 5 figures. Published versionInternational audienceWe stu...
23 pages, 4 figures, Typos correctedWe study the record statistics of random walks after $n$ steps, ...
24 pages, 7 figures. Version submitted for publicationInternational audienceWe compute exactly the m...
We consider the occurrence of record-breaking events in random walks with asymmetric jump distributi...
We consider random walks with continuous and symmetric step distributions. We prove universal asympt...
We study the statistics of records of a one-dimensional random walk of n steps, starting from the or...
40 pages, 11 figures, contribution to the JSTAT Special Issue based on the Galileo Galilei Institute...
We investigate the statistics of three kinds of records associated with planar random walks, namely ...
We address the theory of records for integrated random walks with finite variance. The long-time con...
Abstract.- The statistics of records for a time series generated by a continuous time random walk is...
We study the random walk X on the range of a simple random walk on ℤ d in dimensions d≥4. When d≥...
We examine distance record setting by a random walker in the presence of a measurement error δ and a...
64 pages, 14 figures. Topical review, submitted for publication in J. Phys. AWe review recent advanc...
The deviation principles of record numbers in random walk models have not been completely investigat...
30 pages, 9 figures. Revised (and published) version. To appear in J. Phys. AInternational audienceW...
6 pages + 5 pages of supplemental material, 5 figures. Published versionInternational audienceWe stu...
23 pages, 4 figures, Typos correctedWe study the record statistics of random walks after $n$ steps, ...
24 pages, 7 figures. Version submitted for publicationInternational audienceWe compute exactly the m...
We consider the occurrence of record-breaking events in random walks with asymmetric jump distributi...
We consider random walks with continuous and symmetric step distributions. We prove universal asympt...
We study the statistics of records of a one-dimensional random walk of n steps, starting from the or...
40 pages, 11 figures, contribution to the JSTAT Special Issue based on the Galileo Galilei Institute...
We investigate the statistics of three kinds of records associated with planar random walks, namely ...
We address the theory of records for integrated random walks with finite variance. The long-time con...
Abstract.- The statistics of records for a time series generated by a continuous time random walk is...
We study the random walk X on the range of a simple random walk on ℤ d in dimensions d≥4. When d≥...