Literatura científica selecionada sobre o tema "Arrondi Stochastique"
Crie uma referência precisa em APA, MLA, Chicago, Harvard, e outros estilos
Consulte a lista de atuais artigos, livros, teses, anais de congressos e outras fontes científicas relevantes para o tema "Arrondi Stochastique".
Ao lado de cada fonte na lista de referências, há um botão "Adicionar à bibliografia". Clique e geraremos automaticamente a citação bibliográfica do trabalho escolhido no estilo de citação de que você precisa: APA, MLA, Harvard, Chicago, Vancouver, etc.
Você também pode baixar o texto completo da publicação científica em formato .pdf e ler o resumo do trabalho online se estiver presente nos metadados.
Artigos de revistas sobre o assunto "Arrondi Stochastique"
Tynda, Aleksandr, Samad Noeiaghdam e Denis Sidorov. "Polynomial Spline Collocation Method for Solving Weakly Regular Volterra Integral Equations of the First Kind". Bulletin of Irkutsk State University. Series Mathematics 39 (2022): 62–79. http://dx.doi.org/10.26516/1997-7670.2022.39.62.
Texto completo da fonteNoeiaghdam, Samad, e Sanda Micula. "A Novel Method for Solving Second Kind Volterra Integral Equations with Discontinuous Kernel". Mathematics 9, n.º 17 (5 de setembro de 2021): 2172. http://dx.doi.org/10.3390/math9172172.
Texto completo da fonteNoeiaghdam, Samad, Aliona Dreglea, Jihuan He, Zakieh Avazzadeh, Muhammad Suleman, Mohammad Ali Fariborzi Araghi, Denis N. Sidorov e Nikolai Sidorov. "Error Estimation of the Homotopy Perturbation Method to Solve Second Kind Volterra Integral Equations with Piecewise Smooth Kernels: Application of the CADNA Library". Symmetry 12, n.º 10 (20 de outubro de 2020): 1730. http://dx.doi.org/10.3390/sym12101730.
Texto completo da fonteNoeiaghdam, L., S. Noeiaghdam e D. N. Sidorov. "Dynamical control on the Adomian decomposition method for solving shallow water wave equation". iPolytech Journal 25, n.º 5 (9 de novembro de 2021): 623–32. http://dx.doi.org/10.21285/1814-3520-2021-5-623-632.
Texto completo da fonteNoeiaghdam, Samad, e Mohammad Ali Fariborzi Araghi. "A Novel Algorithm to Evaluate Definite Integrals by the Gauss-Legendre Integration Rule Based on the Stochastic Arithmetic: Application in the Model of Osmosis System". Mathematical Modelling of Engineering Problems 7, n.º 4 (18 de dezembro de 2020): 577–86. http://dx.doi.org/10.18280/mmep.070410.
Texto completo da fonteAraghi, Mohammad Ali Fariborzi, e Samad Noeiaghdam. "A Valid Scheme to Evaluate Fuzzy Definite Integrals by Applying the CADNA Library". International Journal of Fuzzy System Applications 6, n.º 4 (outubro de 2017): 1–20. http://dx.doi.org/10.4018/ijfsa.2017100101.
Texto completo da fonteNoeiaghdam, Samad, Sanda Micula e Juan J. Nieto. "A Novel Technique to Control the Accuracy of a Nonlinear Fractional Order Model of COVID-19: Application of the CESTAC Method and the CADNA Library". Mathematics 9, n.º 12 (8 de junho de 2021): 1321. http://dx.doi.org/10.3390/math9121321.
Texto completo da fonteNoeiaghdam, Samad, Denis Sidorov, Alyona Zamyshlyaeva, Aleksandr Tynda e Aliona Dreglea. "A Valid Dynamical Control on the Reverse Osmosis System Using the CESTAC Method". Mathematics 9, n.º 1 (28 de dezembro de 2020): 48. http://dx.doi.org/10.3390/math9010048.
Texto completo da fonteNoeiaghdam, Samad, Denis Sidorov, Abdul-Majid Wazwaz, Nikolai Sidorov e Valery Sizikov. "The Numerical Validation of the Adomian Decomposition Method for Solving Volterra Integral Equation with Discontinuous Kernels Using the CESTAC Method". Mathematics 9, n.º 3 (28 de janeiro de 2021): 260. http://dx.doi.org/10.3390/math9030260.
Texto completo da fonteNoeiaghdam, Samad, Aliona Dreglea, Hüseyin Işık e Muhammad Suleman. "A Comparative Study between Discrete Stochastic Arithmetic and Floating-Point Arithmetic to Validate the Results of Fractional Order Model of Malaria Infection". Mathematics 9, n.º 12 (20 de junho de 2021): 1435. http://dx.doi.org/10.3390/math9121435.
Texto completo da fonteTeses / dissertações sobre o assunto "Arrondi Stochastique"
El, Arar El-Mehdi. "Stochastic models for the evaluation of numerical errors". Electronic Thesis or Diss., université Paris-Saclay, 2023. http://www.theses.fr/2023UPASG104.
Texto completo da fonteThe idea of assuming rounding errors as random variables is not new. Based on tools such as independent random variables or the Central Limit Theorem, various propositions have demonstrated error bounds in O(√n). This thesis is dedicated to studying stochastic rounding (SR) as a replacement for the default deterministic rounding mode. First, we introduce a new approach to derive a probabilistic error bound in O(√n) based on variance calculation and Bienaymé-Chebyshev inequality. Second, we demonstrate a general framework that allows the probabilistic error analysis of algorithms under SR. In this context, we decompose the error into a martingale plus a drift. We show that the drift is zero for algorithms with multi-linear errors, while the probabilistic analysis of the martingale term leads to probabilistic error bounds in O(√n). We show that the drift is negligible at the first order compared to the martingale term for the variance computation, and we prove probabilistic error bounds in O(√n)
Chotin-Avot, Roselyne. "Architectures matérielles pour l'arithmétique stochastique discrète". Paris 6, 2003. http://hal.upmc.fr/tel-01267458.
Texto completo da fonte