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Results: 83
Number of items: 83
  • Demlow, A., & Stevenson, R. (2011). Convergence and quasi-optimality of an adaptive finite element method for controlling L2 errors. Numerische Mathematik, 117(2), 185-218. https://doi.org/10.1007/s00211-010-0349-9
  • Open Access
    Stevenson, R. (2011). Multischaal methoden in de numerieke wiskunde. (Oratiereeks; No. 415). Universiteit van Amsterdam. http://www.oratiereeks.nl/upload/pdf/PDF-5143weboratie_Stevenson_Latex.pdf
  • Open Access
    Chegini, N., & Stevenson, R. (2011). Adaptive wavelet schemes for parabolic problems: sparse matrices and numerical results. SIAM journal on numerical analysis, 49(1), 182-212. https://doi.org/10.1137/100800555
  • Open Access
    Stevenson, R. (2011). Divergence-free wavelet bases on the hypercube: free-slip boundary conditions, and applications for solving the instationary Stokes equations. Mathematics of Computation, 80(275), 1499-1523. https://doi.org/10.1090/S0025-5718-2011-02471-3
  • Open Access
    Reis da Silva, R. J. (2011). Matrix perturbations: bounding and computing eigenvalues. [Thesis, fully internal, Universiteit van Amsterdam]. Uitgeverij BOXPress.
  • Dijkema, T. J., & Stevenson, R. P. (2010). A sparse Laplacian in tensor product wavelet coordinates. Numerische Mathematik, 115(3), 433-449. https://doi.org/10.1007/s00211-010-0288-5
  • Open Access
    Dauge, M., & Stevenson, R. (2010). Sparse tensor product wavelet approximation of singular functions. SIAM Journal on Mathematical Analysis, 42(5), 2203-2228. https://doi.org/10.1137/090764694
  • Nguyen, H., & Stevenson, R. (2009). Finite element wavelets with improved quantitative properties. Journal of Computational and Applied Mathematics, 230(2), 706-727. https://doi.org/10.1016/j.cam.2009.01.007
  • Dijkema, T. J., Schwab, C., & Stevenson, R. (2009). An adaptive wavelet method for solving high-dimensional elliptic PDEs. Constructive Approximation, 30(3), 423-455. https://doi.org/10.1007/s00365-009-9064-0
  • Stevenson, R. (2009). Adaptive wavelet methods for solving operator equations: An overview. In R. A. DeVore, & A. Kunoth (Eds.), Multiscale, nonlinear and adaptive approximation: Dedicated to Wolfgang Dahmen on the occasion of his 60th birthday (pp. 543-597). Springer. https://doi.org/10.1007/978-3-642-03413-8_13
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