Computational Mathematics, Department of Mathematical Sciences
Chalmers University of Technology and University of Gothenburg

Lecture notes of Stig Larsson

Complete list of publications in pdf. Go back.
  1. S. Larsson,
    Numerical analysis of semilinear parabolic problems,
    Published in ``The Graduate Student's Guide to Numerical Analysis '98.
    Lecture Notes from the VIII EPSRC Summer School in Numerical Analysis'',
    editors M. Ainsworth, J. Levesley, and M. Marletta,
    SSCM volume 26, Springer-Verlag, 1999, pp. 83-117.
    (abstract, amslatex, dvi, postscript)
  2. S. Larsson,
    Preservation of strong stability associated with analytic semigroups,
    ``Collected Lectures on Preservation of Stability under Discretization'',
    Proceedings in Applied Mathematics 109, D. Estep and S. Tavener, editors, SIAM, 2002, pp. 11-24.
    (amslatex, dvi, pdf, postscript)
  3. S. Larsson,
    Semilinear parabolic partial differential equations - theory, approximation, and application,
    New Trends in the Mathematical and Computer Sciences (G. O. S. Ekhaguere, C. K. Ayo, and M. B. Olorunsaiye, eds.),
    Proceedings of an international workshop at Covenant University, Ota, Nigeria, June 18-23, 2006,
    Publications of the ICMCS, vol. 3, 2006, pp. 153-194.
    (abstract, amslatex, pdf, postscript)
  4. M. Kovacs and S. Larsson,
    Introduction to stochastic partial differential equations,
    Proceedings of ''New Directions in the Mathematical and Computer Sciences'', National Universities Commission, Abuja, Nigeria, October 8-12, 2007.
    Publications of the ICMCS, vol. 4, 2008, pp. 159-232. (pdf)
  5. M. Kovács and S. Larsson,
    Introduction to stochastic partial differential equations,
    lecture notes, 2008.
    (abstract, amslatex, pdf)
  6. Stig Larsson,
    Numerical methods for stochastic ordinary differential equations,
    lecture notes, Chalmers University of Technology, 2008.
    (latex, pdf)
  7. Stig Larsson,
    Semilinear parabolic problems,
    Mathematics, Chalmers University of Technology, 1996.
    (amstex, dvi, postscript)
  8. Stig Larsson,
    The Cahn-Hilliard equation,
    Mathematics, Chalmers University of Technology, 1988.
    (amstex, pdf, postscript)