1. P. Deuflhard, B. Erdmann, R. Roitzsch, G.T. Lines: Adaptive Finite Element Simulation of Ventricular Fibrillation Dynamics. J. Computing and Visualization in Science (CVS), Springer Verlag, erscheint Online: Online First (35), Eintrag No. 20 (8. April 2008).

  2. P. Colli Franzone, P. Deuflhard, B. Erdmann, J. Lang, L.F. Pavarino: Adaptivity in Space and Time for Reaction-Diffusion Systems in Electrocardiology. SIAM J. Sci. Comput., Vol. 28, No. 3, pp. 942-962, SIAM (2006).

  3. M. Weiser, P. Deuflhard, B. Erdmann: Affine conjugate adaptive newton methods for nonlinear elastomechanics. Opt. Meth. Softw. 22 (3): 413-431, 2007.

  4. M. Weiser, A. Schiela, P. Deuflhard: Asymptotic Mesh Independence of Newton's Method Revisited. SIAM J. Numer. Anal. 42 (5), pp. 1830-1845 (2005).

  5. K. Schaber, O. Ofenloch, R. Ehrig, P. Deuflhard: Aerosolbildung in Gas/Flüssigkeits-Kontaktapparaten - Modellierungsstrategien und Simulation. Chemie Ingenieur Technik 76 (9), pp. 1358-1359 (2004).

  6. P. Deuflhard: Differential Equations in Technology and Medicine. Computational Concepts, Adaptive Algorithms, and Virtual Labs. Computational Mathematics Driven by Industrial Problems. Lecture Notes in Mathematics 1739, Springer-Verlag, pp. 69-125 (2000).

  7. P. Deuflhard, J. Heroth, U. Maas: Towards Dynamic Dimension Reduction in Reactive Flow Problems. In: Proc. 3rd Workshop on Modelling of Chemical Reaction Systems (CD-Version), Heidelberg (1996).

  8. J. Fröhlich, P. Deuflhard: Moving Weight Galerkin Methods for Turbulent Reactive Flows. In: H. Neunzert (ed.), ``Topics in Industrial Mathematics'', Proc. 8th Conference of the European Consortium for Mathematics in Industry (ECMI 94), Wiley & Teubner Publishers, pp. 176-184 (1996).

  9. P. Deuflhard: Computational Mathematics as Key Technology. In: A. Sydow (ed.), "Systems Analysis Modelling Simulation (SAMS)'', Proc. IMACS Symposium on Systems Analysis and Simulation, Berlin, 26-30 June 1995, Gordon and Breach Science Publishers SA, Vol. 18-19, pp. 19-26 (1995).

  10. F. Schmidt, P. Deuflhard: Discrete Transparent Boundary Conditions for the Numerical Solution of Fresnel's Equation. Int. Journal of Computers Math. Applic., Pergamon Press, Vol. 29, No. 9 , pp. 53-76 (1995).

  11. F. Schmidt, P. Deuflhard: Discrete transparent boundary conditions for Fresnel's equation. In: Procs. Integrated Photonics Research. San Francisco, California, USA, February 17-19, 1994. Optical Society of America, pp. 45-47 (1994).

  12. P. Deuflhard, F. A. Potra: Asymptotic Mesh Independence of Newton-Galerkin Methods Via a Refined Mysovskii Theorem. SIAM J. Numer. Anal., 29, pp. 1395-1412 (1992).