Persistence probabilities of weighted sums of stationary Gaussian sequences

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Aurzada, Frank, and Sumit Mukherjee. “Persistence Probabilities of Weighted Sums of Stationary Gaussian Sequences”. Stochastic Processes and Their Applications, vol. 159, 2023, pp. 286-19, https://doi.org/10.1016/j.spa.2023.02.003.
Aurzada, F., & Mukherjee, S. (2023). Persistence probabilities of weighted sums of stationary Gaussian sequences. Stochastic Processes and Their Applications, 159, 286-319. https://doi.org/10.1016/j.spa.2023.02.003
Aurzada, Frank, and Sumit Mukherjee. “Persistence Probabilities of Weighted Sums of Stationary Gaussian Sequences”. Stochastic Processes and Their Applications 159 (2023): 286-319. https://doi.org/10.1016/j.spa.2023.02.003.
Aurzada F, Mukherjee S. Persistence probabilities of weighted sums of stationary Gaussian sequences. Stochastic Processes and their Applications. 2023;159:286-319.
Refrences
Title Journal Journal Categories Citations Publication Date
Persistence exponents in Markov chains 2021
Persistence of Gaussian stationary processes: a spectral perspective The Annals of Probability
  • Science: Mathematics: Probabilities. Mathematical statistics
  • Science: Mathematics
2021
Persistence of sums of correlated increments and clustering in cellular automata Stochastic Processes and their Applications
  • Science: Mathematics: Probabilities. Mathematical statistics
  • Science: Mathematics
7 2019
Persistence Probabilities of Two-Sided (Integrated) Sums of Correlated Stationary Gaussian Sequences Journal of Statistical Physics
  • Science: Mathematics
  • Science: Physics
7 2018
Persistence probabilities for stationary increment processes Stochastic Processes and their Applications
  • Science: Mathematics: Probabilities. Mathematical statistics
  • Science: Mathematics
15 2018
Refrences Analysis
The category Science: Mathematics 9 is the most frequently represented among the references in this article. It primarily includes studies from The Annals of Probability and Stochastic Processes and their Applications. The chart below illustrates the number of referenced publications per year.
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Citations
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
Citations Analysis
Category Category Repetition
Science: Mathematics1
Science: Physics1
The category Science: Mathematics 1 is the most commonly referenced area in studies that cite this article. The first research to cite this article was titled Persistence Probabilities of a Smooth Self-Similar Anomalous Diffusion Process and was published in 2024. 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 2024, with 1 citations. It has been cited in 1 different journals. Among related journals, the Journal of Statistical Physics cited this research the most, with 1 citations. The chart below illustrates the annual citation trends for this article.
Citations used this article by year