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

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

  3. 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).

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

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