  | Aragón Artacho, F. J., Borwein, J. M., Martín-Márquez, V., & Yao, L. (In press). Applications of convex analysis within mathematics. Mathematical Programming, 1-40. doi:10.1007/s10107-013-0707-3  Peer reviewed |
 | Aragón Artacho, F. J., Borwein, J. M., & Tam, M. K. (In press). Recent Results on Douglas–Rachford Methods for Combinatorial Optimization Problems. Journal of Optimization Theory and Applications. doi:10.1007/s10957-013-0488-0 Peer reviewed |
  | Aragón Artacho, F. J., & Fleming, R. M. (2015). Globally convergent algorithms for finding zeros of duplomonotone mappings. Optimization Letters, 3 (3), 569–584. doi:10.1007/s11590-014-0769-z Peer Reviewed verified by ORBi |
 | Aragón Artacho, F. J., Fleming, R. M., & Phan, V. (2015). Accelerating the DC algorithm for smooth functions. ORBilu-University of Luxembourg. https://orbilu.uni.lu/handle/10993/26848. |
 | Aragón Artacho, F. J., Belyakov, A., Dontchev, A. L., & López, M. (2014). Local convergence of quasi-Newton methods under metric regularity. Computational Optimization and Applications, 58 (1), 225-247. doi:10.1007/s10589-013-9615-y Peer reviewed |
 | Aragón Artacho, F. J., & Geoffroy, M. H. (2014). Metric subregularity of the convex subdifferential in Banach spaces. Journal of Nonlinear and Convex Analysis, 15 (1), 35-47. Peer reviewed |
 | Aragón Artacho, F. J., Borwein, J. M., & Tam, M. K. (2014). Douglas-Rachford Feasibility Methods for Matrix Completion Problems. ANZIAM Journal, 55 (4), 299-326. doi:10.1017/S1446181114000145 Peer Reviewed verified by ORBi |
 | Aragón Artacho, F. J., Bailey, D. H., Borwein, J. M., & Borwein, P. B. (2013). Walking on Real Numbers. Mathematical Intelligencer, 35 (1), 42-60. doi:10.1007/s00283-012-9340-x Peer reviewed |
 | Aragón Artacho, F. J., Borwein, J. M., & Tam, M. K. (2013). Recent Results on Douglas–Rachford Methods. Serdica Mathematical Journal, 39, 313-330. Peer reviewed |
 | Aragón Artacho, F. J., & Borwein, J. M. (2013). Global convergence of a non-convex Douglas-Rachford iteration. Journal of Global Optimization, 57 (3), 753-769. doi:10.1007/s10898-012-9958-4 Peer reviewed |
 | Aragón Artacho, F. J., & Gaydu, M. (2012). A Lyusternik - Graves theorem for the proximal point method. Computational Optimization and Applications, 52 (3), 785-803. doi:10.1007/s10589-011-9439-6 Peer reviewed |
 | Aragón Artacho, F. J., & Mordukhovich, B. S. (2011). Enhanced metric regularity and Lipschitzian properties of variational systems. Journal of Global Optimization, 50 (1), 145-167. doi:10.1007/s10898-011-9698-x Peer reviewed |
 | Aragón Artacho, F. J., Dontchev, A. L., Gaydu, M., Geoffroy, M. H., & Veliov, V. M. (2011). Metric regularity of Newton's iteration. SIAM Journal on Control and Optimization, 49 (2), 339-362. doi:10.1137/100792585 Peer reviewed |
 | Aragón Artacho, F. J., & Mordukhovich, B. S. (2010). Metric regularity and Lipschitzian stability of parametric variational systems. Nonlinear Analysis: Theory, Methods and Applications, 72 (3-4), 1149-1170. doi:10.1016/j.na.2009.07.051 Peer reviewed |
 | Aragón Artacho, F. J., & Geoffroy, M. H. (2008). Characterization of metric regularity of subdifferentials. Journal of Convex Analysis, 15 (2), 365-380. Peer Reviewed verified by ORBi |
 | Aragón Artacho, F. J. (2007). A new and self-contained proof of Borwein's norm duality theorem. Set-Valued Analysis, 15 (3), 307-315. doi:10.1007/s11228-006-0040-6 Peer reviewed |
 | Aragón Artacho, F. J., & Dontchev, A. L. (2007). On the inner and outer norms of sublinear mappings. Set-Valued Analysis, 15 (1), 61-65. doi:10.1007/s11228-006-0034-4 Peer reviewed |
 | Aragón Artacho, F. J. (2007). Convergence of the proximal point method for metrically regular mappings. ESAIM: Proceedings and Surveys, 17, 1-8. doi:10.1051/proc:071701 Peer reviewed |
 | Aragón Artacho, F. J., & Geoffroy, M. H. (2007). Uniformity and inexact version of a proximal method for metrically regular mappings. Journal of Mathematical Analysis and Applications, 335 (1), 168-183. doi:10.1016/j.jmaa.2007.01.050 Peer reviewed |