Persistence of Gaussian processes: non-summable correlations

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Dembo, Amir, and Sumit Mukherjee. “Persistence of Gaussian Processes: Non-Summable Correlations”. Probability Theory and Related Fields, vol. 169, no. 3-4, 2016, pp. 1007-39, https://doi.org/10.1007/s00440-016-0746-9.
Dembo, A., & Mukherjee, S. (2016). Persistence of Gaussian processes: non-summable correlations. Probability Theory and Related Fields, 169(3-4), 1007-1039. https://doi.org/10.1007/s00440-016-0746-9
Dembo, Amir, and Sumit Mukherjee. “Persistence of Gaussian Processes: Non-Summable Correlations”. Probability Theory and Related Fields 169, no. 3-4 (2016): 1007-39. https://doi.org/10.1007/s00440-016-0746-9.
Dembo A, Mukherjee S. Persistence of Gaussian processes: non-summable correlations. Probability Theory and Related Fields. 2016;169(3-4):1007-39.
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Title Journal Journal Categories Citations Publication Date
Persistence Probabilities of a Smooth Self-Similar Anomalous Diffusion Process

 Journal of Statistical Physics
  • Science: Mathematics
  • Science: Physics
 2024
Persistence probabilities of weighted sums of stationary Gaussian sequences Stochastic Processes and their Applications
  • Science: Mathematics: Probabilities. Mathematical statistics
  • Science: Mathematics
 1 2023
Persistence probabilities of mixed FBM and other mixed processes

 Journal of Physics A: Mathematical and Theoretical
  • Science: Physics
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  • Science: Physics
 2022
First passage times over stochastic boundaries for subdiffusive processes

 Transactions of the American Mathematical Society
  • Science: Mathematics
 2022
Asymptotics of the Persistence Exponent of Integrated Fractional Brownian Motion and Fractionally Integrated Brownian Motion Theory of Probability & Its Applications
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 1 2022
Citations Analysis
Category Category Repetition
Science: Mathematics13
Science: Mathematics: Probabilities. Mathematical statistics6
Science: Physics5
The category Science: Mathematics 13 is the most commonly referenced area in studies that cite this article. The first research to cite this article was titled Point Processes, Hole Events, and Large Deviations: Random Complex Zeros and Coulomb Gases and was published in 2018. The most recent citation comes from a 2024 study titled Persistence Probabilities of a Smooth Self-Similar Anomalous Diffusion Process. This article reached its peak citation in 2022, with 5 citations. It has been cited in 11 different journals. Among related journals, the Journal of Statistical Physics cited this research the most, with 4 citations. The chart below illustrates the annual citation trends for this article.
Citations used this article by year