The self-similar dynamics of renewal processes (2011)
- Authors:
- Autor USP: FISHER, ALBERT MEADS - IME
- Unidade: IME
- DOI: 10.1214/EJP.v16-888
- Assunto: TEOREMAS LIMITES
- Keywords: stable process; renewal process; Mittag-Leffler process; Cauchy process; almost-sure invariance principle in log density; pathwise Central Limit Theorem
- Language: Inglês
- Imprenta:
- Source:
- Título do periódico: Electronic Journal of Probability
- ISSN: 1083-6489
- Volume/Número/Paginação/Ano: v. 16, p. 929-961, 2011
- Este periódico é de acesso aberto
- Este artigo é de acesso aberto
- URL de acesso aberto
- Cor do Acesso Aberto: gold
- Licença: cc-by
-
ABNT
FISHER, Albert Meads e TALET, Marina. The self-similar dynamics of renewal processes. Electronic Journal of Probability, v. 16, p. 929-961, 2011Tradução . . Disponível em: https://doi.org/10.1214/EJP.v16-888. Acesso em: 19 set. 2024. -
APA
Fisher, A. M., & Talet, M. (2011). The self-similar dynamics of renewal processes. Electronic Journal of Probability, 16, 929-961. doi:10.1214/EJP.v16-888 -
NLM
Fisher AM, Talet M. The self-similar dynamics of renewal processes [Internet]. Electronic Journal of Probability. 2011 ; 16 929-961.[citado 2024 set. 19 ] Available from: https://doi.org/10.1214/EJP.v16-888 -
Vancouver
Fisher AM, Talet M. The self-similar dynamics of renewal processes [Internet]. Electronic Journal of Probability. 2011 ; 16 929-961.[citado 2024 set. 19 ] Available from: https://doi.org/10.1214/EJP.v16-888 - The scenery flow for geometric structures on the torus: the linear setting
- Minimality and unique ergodicity for adic transformations
- Nonstationary mixing and the unique ergodicity of adic transformations
- Small-scale structure via flows
- Anosov families, renormalization and non-stationary subshifts
- Dynamical attraction to stable processes
- Asymptotic self-similarity and order-two ergodic theorems for renewal flows
- On invariant line fields
- The scenery flow for hyperbolic Julia sets
- Exact bounds for the polynomial decay of correlation 1/f noise and the CLT for the equilibrium state of a non-Holder potential
Informações sobre o DOI: 10.1214/EJP.v16-888 (Fonte: oaDOI API)
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