In this paper, we consider mixed-integer nonlinear constrained optimization problems. Specifically, we assume that the integrality constraints are non-relaxable, that is, the functions appearing in the problem cannot be computed when the integrality constraints are violated. To solve this class of problems, we propose an augmented Lagrangian-type algorithm which is able to handle integer variables by means of primitive directions. A theoretical analysis of the convergence properties of the proposed algorithm is carried out. Finally, some numerical experimentation is reported.
Cristofari, A., Di Pillo, G., Liuzzi, G., Lucidi, S. (2026). An Augmented Lagrangian-Based Method Using Primitive Directions for Mixed-Integer Nonlinear Problems. JOURNAL OF OPTIMIZATION THEORY AND APPLICATIONS, 209(2) [10.1007/s10957-026-02981-9].
An Augmented Lagrangian-Based Method Using Primitive Directions for Mixed-Integer Nonlinear Problems
Cristofari, Andrea;
2026-01-01
Abstract
In this paper, we consider mixed-integer nonlinear constrained optimization problems. Specifically, we assume that the integrality constraints are non-relaxable, that is, the functions appearing in the problem cannot be computed when the integrality constraints are violated. To solve this class of problems, we propose an augmented Lagrangian-type algorithm which is able to handle integer variables by means of primitive directions. A theoretical analysis of the convergence properties of the proposed algorithm is carried out. Finally, some numerical experimentation is reported.| File | Dimensione | Formato | |
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