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

  2. P. Deuflhard, F. Bornemann: Scientific Computing with Ordinary Differential Equations. Texts in Applied Mathematics 42, Springer (2002).

  3. P. Deuflhard, F. Bornemann: Numerische Mathematik II. Gewöhnliche Differentialgleichungen. 2. vollständig überarbeitete und erweiterte Auflage. de Gruyter: Berlin, New York (2002).

  4. P. Deuflhard: Commentary on Cornelius Lanczos's Solution of Ordinary Differential Equations by Trigonometric Interpolation. In : W.R. Davis, M.T. Chu, P. Dolan, J.R. McConnell, L.K. Noris, E. Ortiz, R.J. Plemmons, D. Ridgeway, B.K.P. Scaife, W.J. Stewart, J.W. York, Jr., W.O. Doggett, B .M. Gellai, A.A. Gsponer, C.A. Prioli (eds.), Cornelius Lanczos Collected Published Papers with Commentaries, North Carolina State University, Raleigh, Vol. VI, pp. 3-667 - 3-669 (1999).

  5. P. Deuflhard: Commentary on Cornelius Lanczos's Extended Boundary Value Problems. In: W.R. Davis, M.T. Chu, P. Dolan, J.R. McConnell, L.K. Noris, E. Ortiz, R.J. Plemmons, D. Ridgeway, B.K.P. Scaife, W.J. Stewart, J.W. York, Jr., W.O. Doggett, B.M. Gellai, A.A. Gsponer, C.A. Prioli (eds.), Cornelius Lanczos Collected Published Papers with Commentaries, North Carolina State University, Raleigh, Vol. VI, pp. 3-650 - 3-653 (1999).

  6. R. Schöpf, P. Deuflhard: OCCAL -- a mixed symbolic-numeric Optimal Control CALculator. International Series of Numerical Mathematics, Birkhäuser Verlag Basel, Vol. 115, pp. 269-278 (1994).

  7. P. Deuflhard, G. Bader: Multiple Shooting Techniques Revisited. In: Deuflhard/Hairer (eds.): Numerical Treatment of Inverse Problems in Differential and Integral Equations. Series ``Progress in Scientific Computing'', Birkhäuser/Boston, pp. 74-94 (1983).

  8. 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).

  9. P. Deuflhard: A Stepsize Control for Continuation Methods and its Special Application to Multiple Shooting Techniques. Numer. Math. 33, pp. 115-146 (1979) (contains new results beyond habilitation thesis).

  10. P. Deuflhard: Nonlinear Equation Solvers in Boundary Value Problem Codes. In: B. Childs et al. (eds.): Proc. Working Conf. on ``Codes for BVPs in ODEs'', Houston/Texas 1978, Springer Lecture Notes Computer Science 74, pp. 40-66 (1979).

  11. P. Deuflhard, H.-J. Pesch, P. Rentrop: A Modified Continuation Method for the Numerical Solution of Nonlinear Two-Point Boundary Value Problems by Shooting Techniques. Numer. Math. 26, pp. 327-343 (1976).

  12. Habilitation thesis, Mathematics (Dec. 1976): A Stepsize Control for Continuation Methods with Special Application to Multiple Shooting Techniques. Math. Institute, Technical University of Munich.

  13. P. Deuflhard: A Relaxation Strategy for the Modified Newton Method. In: Bulirsch/Oettli/Stoer (eds.): Optimization and Optimal Control. Springer Lecture Notes 477, pp. 59-73 (1975).

  14. P. Deuflhard: A Modified Newton Method for the Solution of Ill-Conditioned Systems of Nonlinear Equations with Application to Multiple Shooting. Numer. Math. 22, pp. 289-315 (1974).

  15. Dissertation, Mathematics (Dec. 1972): Ein Newton-Verfahren bei fast singulärer Funktionalmatrix zur Lösung von nichtlinearen Randwertaufgaben mit der Mehrzielmethode, (supervisor: R. Bulirsch). Math. Institute, University of Cologne.