PUB - Publikationen an der Universität Bielefeld

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• [13]
  

  2024 | Zeitschriftenaufsatz | E-Veröff. vor dem Druck | PUB-ID: 2986611

  Mukam, J.D., Tambue, A.: Weak Convergence of the Rosenbrock Semi-implicit Method for Semilinear Parabolic SPDEs Driven by Additive Noise. Computational Methods in Applied Mathematics. (2024).

  PUB | DOI | WoS
   
• [12]
  

  2023 | Zeitschriftenaufsatz | Veröffentlicht | PUB-ID: 2968036

  Tambue, A., Mukam, J.D.: Weak convergence of the finite element method for semilinear parabolic SPDEs driven by additive noise. Results in Applied Mathematics. 17, : 100351 (2023).

  PUB | DOI | WoS
   
• [11]
  

  2021 | Zeitschriftenaufsatz | Veröffentlicht | PUB-ID: 2958788

  Tambue, A., Mukam, J.D.: Higher order stable schemes for stochastic convection–reaction–diffusion equations driven by additive Wiener noise. Mathematical Methods in the Applied Sciences. : mma.7588 (2021).

  PUB | PDF | DOI | WoS
   
• [10]
  

  2020 | Zeitschriftenaufsatz | Veröffentlicht | PUB-ID: 2958787

  Tambue, A., Mukam, J.D.: Magnus-type integrator for non-autonomous SPDEs driven by multiplicative noise. Discrete & Continuous Dynamical Systems - A. 40, 4597-4624 (2020).

  PUB | DOI | WoS
   
• [9]
  

  2020 | Zeitschriftenaufsatz | Veröffentlicht | PUB-ID: 2958786

  Mukam, J.D., Tambue, A.: Strong convergence of the linear implicit Euler method for the finite element discretization of semilinear non-autonomous SPDEs driven by multiplicative or additive noise. Applied Numerical Mathematics. 147, 222-253 (2020).

  PUB | DOI | WoS
   
• [8]
  

  2020 | Zeitschriftenaufsatz | Veröffentlicht | PUB-ID: 2958783

  Tambue, A., Mukam, J.D.: Optimal error estimate of the finite element approximation of second order semilinear non-autonomous parabolic PDEs. Indagationes Mathematicae. 31, 714-727 (2020).

  PUB | DOI | WoS
   
• [7]
  

  2020 | Zeitschriftenaufsatz | Veröffentlicht | PUB-ID: 2958782

  Mukam, J.D., Tambue, A.: Strong convergence of a stochastic Rosenbrock-type scheme for the finite element discretization of semilinear SPDEs driven by multiplicative and additive noise. Stochastic Processes and their Applications. 130, 4968-5005 (2020).

  PUB | DOI | WoS
   
• [6]
  

  2019 | Zeitschriftenaufsatz | Veröffentlicht | PUB-ID: 2959421

  Tambue, A., Mukam, J.D.: Strong convergence and stability of the semi-tamed and tamed Euler schemes for stochastic differential equations with jumps under non-global Lipschitz condition. Int. J. Numer. Anal. Mod., 16, pp. 847-872. (2019).

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• [5]
  

  2019 | Zeitschriftenaufsatz | Veröffentlicht | PUB-ID: 2958781

  Mukam, J.D., Tambue, A.: Optimal strong convergence rates of numerical methods for semilinear parabolic SPDE driven by Gaussian noise and Poisson random measure. Computers & Mathematics with Applications. 77, 2786-2803 (2019).

  PUB | DOI | WoS
   
• [4]
  

  2019 | Zeitschriftenaufsatz | Veröffentlicht | PUB-ID: 2958785

  Tambue, A., Mukam, J.D.: Strong convergence of the linear implicit Euler method for the finite element discretization of semilinear SPDEs driven by multiplicative or additive noise. Applied Mathematics and Computation. 346, 23-40 (2019).

  PUB | DOI | WoS
   
• [3]
  

  2018 | Konferenzbeitrag | Veröffentlicht | PUB-ID: 2959420

  Mukam, J.D., Tambue, A.: Convergence and Stability of Split-Step-Theta Methods for Stochastic Differential Equations With Jumps Under Non-Global Lipschitz drift Coefficient. Rendiconti Sem. Mat. Univ. Pol. Torino, 76, 2, 165 – 175. (2018).

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• [2]
  

  2018 | Zeitschriftenaufsatz | Veröffentlicht | PUB-ID: 2958779

  Mukam, J.D., Tambue, A.: Strong Convergence Analysis of the Stochastic Exponential Rosenbrock Scheme for the Finite Element Discretization of Semilinear SPDEs Driven by Multiplicative and Additive Noise. Journal of Scientific Computing. 74, 937-978 (2018).

  PUB | DOI | WoS
   
• [1]
  

  2018 | Zeitschriftenaufsatz | Veröffentlicht | PUB-ID: 2958780

  Mukam, J.D., Tambue, A.: A note on exponential Rosenbrock–Euler method for the finite element discretization of a semilinear parabolic partial differential equation. Computers & Mathematics with Applications. 76, 1719-1738 (2018).

  PUB | DOI | WoS