References
A. Brooke, D. Kendrick and A. Meeraus, GAMS-A User Guide (The Scientific Press, Redwood City, CA, 1988).
J. Castillo and I.E. Grossmann, Computation of phase and chemical equilibria, Computers Chem. Engin. 5 (1981) 99–108.
A.R. Conn, N.I.M. Gould and Ph.L. Toint, LANCELOT. A Fortran Package for Large-Scale Nonlinear Optimization (Springer, Berlin, 1992).
GLOPT-a program for constrained global optimization, in: Developments in Global Optimization, Proc. 3rd Workshop Global Optimization, eds. I. Bomze et al., Szeged (1995) to appear.
C.A. Floudas and P.M. Pardalos, A Collection of Test Problems for Constrained Global Optimization Algorithms, Lecture Notes in Computer Science 455 (Springer, Berlin, 1990).
R. Fourer, D.M. Gay and B.W. Kernighan, AMPL. A Modeling Language for Mathematical Programming (Scientific Press, San Francisco, 1993).
E. Hansen, Global Optimization using Interval Analysis, Monographs in Pure and Applied Mathematics (Marcel Dekker, New York, 1992).
C. Jansson and O. Knüppel, A global minimization method: The multidimensional case, Technical Report 92.1, Hamburg-Harburg (1992). Electronic copy at http://www.ti3.tu-harburg.de/ Software.html.
A. Mfayokurera, Nonconvex phase equilibria computations by global minimization, M. Sci. thesis, Department of Chem. Engineering, Univ. of Wisconsin, Wisconsin, MA (1989).
B.A. Murtagh and M.A. Saunders, MINOS 5.1 user's guide, Technical Report SOL 83-20R, Stanford Univ., Stanford, CA (1983, revised 1987).
A. Neumaier, NOP-a compact input format for nonlinear optimization problems, in: Developments in Global Optimization, Proc. 3rd Workshop Global Optimization, eds. I. Bomze et al., Szeged (1995) to appear.
A. Neumaier, Interval Methods for Systems of Equations, Encyclopedia of Mathematics and its Applications 37 (Cambridge Univ. Press, Cambridge, 1990).
H. Renon and J.M. Prausnitz, Local compositions in thermodynamic excess functions for liquid mixtures, AIChE 14 (1968) 135–144.
P. Spellucci, An SQP method for general nonlinear programs using only equality constrained subproblems, Math. Programming 82 (1998) 413–448.
P. Spellucci, A new technique for inconsistent QP problems in the SQP method, Math. Methods Oper. 47 (1998) 355–400.
G.Walster, E. Hansen and S. Sengupta, Test results for a global optimization algorithm, in: Numerical Optimization 1984, eds. P.T. Boggs et al. (SIAM, Philadelphia, 1985) pp. 272–287.
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Schichl, H., Dallwig, S. & Neumaier, A. The NOP-2 Modeling Language for Nonlinear Programming. Annals of Operations Research 104, 281–312 (2001). https://doi.org/10.1023/A:1013115708967
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DOI: https://doi.org/10.1023/A:1013115708967