1. P. Deuflhard: Newton Methods for Nonlinear Problems. Affine Invariance and Adaptive Algorithms. Series Computational Mathematics 35, Springer (2004).

  2. P. Deuflhard, A. Hohmann: Numerical Analysis in Modern Scientific Computing: An Introduction. Second revised and extended edition. Texts in Applied Mathematics 43, Springer (2003).

  3. P. Deuflhard, A. Hohmann: Numerische Mathematik I. Eine algorithmisch orientierte Einführung. 3. überarbeitete und erweiterte Auflage. de Gruyter: Berlin, New York (2002).

  4. C. Wulff, A. Hohmann, P. Deuflhard: Numerical Continuation of Periodic Orbits with Symmetry. Konrad-Zuse-Zentrum Berlin, Preprint SC 94-12 (1994).

  5. P. Deuflhard, F. A. Potra: A Refined Gauss-Newton Mysovskii Theorem. Konrad-Zuse-Zentrum Berlin, Preprint SC 91-4 (1991).

  6. P. Deuflhard, B. Fiedler, P. Kunkel: Numerical Pathfollowing Beyond Critical Points in ODE Models. In: Deuflhard/Engquist (eds.): Large Scale Scientific Computing. Series ``Progress in Scientific Computing'', Birkhäuser/Boston, pp. 97-113 (1987).

  7. P. Deuflhard, B. Fiedler, P. Kunkel: Efficient Numerical Pathfollowing Beyond Critical Points. SIAM J. Numer. Anal. 24, pp. 912-927 (1987).

  8. P. Deuflhard, U. Nowak: Efficient Numerical Simulation and Identification of Large Chemical Reaction Systems. Ber. Bunsenges. 90, pp. 940-946 (1986).

  9. U. Nowak, P. Deuflhard: Identification of Selected Rate Constants in Large Chemical Reaction Systems. Appl. Numer. Math. 1, pp. 59-75 (1985).

  10. P. Deuflhard: Computation of Periodic Solutions of Nonlinear ODEs. BIT 24, pp. 456-466 (1984).

  11. U. Nowak, P. Deuflhard: Towards Parameter Identification for Large Chemical Reaction Systems. In: Deuflhard/Hairer (eds.): Numerical Treatment of Inverse Problems in Differential and Integral Equations. Series ``Progress in Scientific Computing'', Birkhäuser/Boston, pp. 13-26 (1983).

  12. P. Deuflhard, V. Apostolescu: A Study of the Gauss-Newton Method for the Solution of Nonlinear Least Squares Problems. In: Frehse/Pallaschke/Trottenberg (eds.): Special Topics of Applied Mathematics, Amsterdam: North-Holland Publ., pp. 129-150 (1980).

  13. P. Deuflhard: Recent Advances in Multiple Shooting Techniques. In: Gladwell/Sayers (eds.): Computational Techniques for Ordinary Differential Equations, London: Academic Press, pp. 217-272 (1980).

  14. P. Deuflhard, G. Heindl: Affine Invariant Convergence Theorems for Newton's Method and Extensions to Related Methods. SIAM J. Numer. Anal. 16, pp. 1-10 (1979).

  15. P. Deuflhard, V. Apostolescu: An Underrelaxed Gauss-Newton Method for Equality Constrained Nonlinear Least Squares Problems. In: J. Stoer (ed.): Optimization Techniques, Proc. 8th IFIP Conf., Würzburg 1977, part 2, Springer Lecture Notes Control Inf. Sci. 7, pp. 22-32 (1978).