Papers in proccedings

  1. Vulanović, R., Teofanov, Lj., A Modification of the Shishkin Discretization Mesh, Proceedings of the GAMM 2013 Annual Scientific Conference (Novi Sad, Serbia, March 18-22, 2013) Proc. Appl. Math. Mech., Vol. 13 (1), 2013, 429–430
  2. Surla, K., Uzelac, Z., Teofanov, Lj., On a fitting collocation method for a reaction-diffusion problem, XVII Conference on Applied Mathematics, Đ. Herceg, H. Zarin, eds. Department of Mathematics and Informatics Novi Sad, 2007, 97-103
  3. Surla, K., Uzelac, Z., Teofanov, Lj., The Discrete Minimum Principle for a Quadratic Spline Discretization of Singularly Perturbed Problems, 6th Meeting on Applied Scientific Computing and Tools Grid Generation, Approximation and Visualization, IMACS/ISGG Workshop (October 5-7, 2006 Roma, Italy), 2006, 221-228
  4. Surla, K., Uzelac, Z., Teofanov, Lj., A spline collocation method and a special grid of Shishkin type for a singularly perturbed problem, Communications to SIMAI Congress, Vol. 1, 2006 (ISSN 1827-9015), DOI:10.1685/CSC06142
  5. Surla, K., Uzelac, Z., Teofanov, Lj., On a spline collocation method for a singularly perturbed problem, Proceedings of the GAMM 2006 Annual Scientific Conference (Berlin, Germany, March 27-31, 2006), Proc. Appl. Math. Mech. 6(1), 2006, 769-770
  6. Teofanov, Lj., Roos, H. -G, Zarin, H., A finite element method for two-parameter singularly perturbed problems in 2D, Proceedings of the GAMM 2006 Annual Scientific Conference (Berlin, Germany, March 27-31, 2006), Proc. Appl. Math. Mech. 6(1), 2006, 771-772
  7. Pavlović, Lj., Uzelac, Z., A uniformly convergent spline difference scheme for singular perturbation problems of convection-diffusion type, Proceedings of the 10th Congress of Yugoslav Mathematicians, Belgrade, 21-24. 01. 2001, 303-306
  8. Pavlović, Lj., Adžić, N., Nonlinear singularly perturbed problems and spectral approximation, XIII Conference on Applied Mathematics, D. Herceg, K. Surla, N. Krejić, eds. Institute of Mathematics Novi Sad, 2000, 75-84
  9. Uzelac, Z., Surla, K., Pavlović, Lj., An uniformly convergent spline difference method for reaction-diffusion problems, Bulletins for Applied and Computing Mathematics, XC-A (1678: 169-184), PC 126 Goed, 1999
  10. Herceg D., Pavlović, Lj., On higher order difference schemes, XI Conference on Applied Mathematics, D. Herceg, K. Surla, eds. Institute of Mathematics Novi Sad, 1997, 103-116.