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

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

  3. M. Weiser, P. Deuflhard: The Central Path towards the Numerical Solution of Optimal Control Problems. Konrad-Zuse-Zentrum Berlin. ZIB-Report 01-12 (July 2001).

  4. 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).

  5. 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).

  6. 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).

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

  8. 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).

  9. 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.