11. A. Domínguez Corella, N. Jork, Š. Nečasová, and J. S. H. Simon, Stability analysis of the Navier-Stokes velocity tracking problem with bang-bang controls. To appear in Journal of Optimization Theory (JOTA).
10. A. Domínguez Corella and G. Wachsmuth, Stability and genericity of bang-bang controls in affine problems. To appear in Siam Journal on Control and Optimization (SICON).
9. A. Domínguez Corella, N. Jork, and V. M. Veliov, “Solution stability of parabolic optimal control problems with fixed state-distribution of the controls", Serdica Math. J. 49, no. 1-3, 155–186, 2023.
8. A. Domínguez Corella, N. Jork, and V. M. Veliov,“On the solution stability of parabolic optimal control problems,” Comput. Optim. Appl., vol. 86, no. 3, pp. 1035–1079, 2023.
7. E. Casas, A. Domínguez Corella, and N. Jork, “New assumptions for stability analysis in elliptic optimal control problems,” SIAM Journal on Control and Optimization, vol. 61, no. 3, pp. 1394–1414, 2023.
6. A. Domínguez Corella, N. Jork, and V. Veliov, “Stability in affine optimal control problems constrained by semilinear elliptic partial differential equations,” ESAIM Control Optim. Calc. Var., vol. 28, Paper No. 79, 30, 2022.
5. G. Angelov, A. Domínguez Corella, and V. M. Veliov, “On the accuracy of the model predictive control method,” SIAM J. Control Optim., vol. 60, no. 4, pp. 2469–2487, 2022.
4. A. Domínguez Corella and V. Veliov, “Hölder regularity in bang-bang type affine optimal control problems,” in Large-scale scientific computing, ser. Lecture Notes in Comput. Sci. Vol. 13127, Springer, pp. 306–313, 2022.
3. A. Domínguez Corella, M. Quincampoix, and V. M. Veliov, “Strong bi-metric regularity in affine optimal control problems,” Pure Appl. Funct. Anal., vol. 6, no. 6, pp. 1119–1137, 2021.
2. A. Domínguez Corella and O. Hernández-Lerma, “The maximum principle for discrete-time control systems and applications to dynamic games,” J. Math. Anal. Appl., vol. 475, no. 1, pp. 253–277, 2019.
1. A. Domínguez Corella and J. Rivera Noriega, “A class of non-cylindrical domains for parabolic equations,” Lect. Mat., vol. 38, no. 2, pp. 49–63, 2017.