[Aubin, J.P and Ekeland, I. (1984) Applied Nonlinear Analysis. Wiley Interscience.]Search in Google Scholar
[Barbu, V. and Precupanu, Th. (1978) Convexity and Optimization. Sijthoff-Noordhoff.]Search in Google Scholar
[Bressan, A. (2007) Differential inclusions and the control of forest fires. J. Diff. Equa. 243 179-207.]Search in Google Scholar
[Bressan, A. and Zhang, D. (2012) Control Problems for a Class of Set Valued Evolutions. Set Valued Var. Anal. 20: 581-601.]Search in Google Scholar
[Bot, R.I. and Csetnek, E.R. (2012) Regularity conditions via generalized interiority notions in convex optimization: new achievements and their relation to some classical statements. Optimization 61(1), 35-65.]Search in Google Scholar
[Cannarsa, P. and Sinestrari, C. (2004) Semiconcave Functions, Hamilton-Jacobi Equations and Optimal Control. Birkhäuser, Basel.]Search in Google Scholar
[Daniilis, A. and Malick, J. (2005) Filling the gap between Lower-C2 and Lower-C2 functions. J. Convex Analysis, 12, 2, 315-320.]Search in Google Scholar
[Daniilis, A. and Georgiev, P. (2004) Approximate convexity and submonotonicity. J. Math. Anal. Appl. 291 292-301.]Search in Google Scholar
[Georgiev, P. (1997) Submonotone mappings in Banach spaces and applications. Set Valued Analysis 5, 1-35.]Search in Google Scholar
[Goeleven, D and Motreanu, D. (2003) Variational and Hemivariational Inequalities: Volume II, Unilateral Problems. Kluwer Academic Publishers.]Search in Google Scholar
[Huang, H and Li, R. (2011) Global Error Bounds for γ-paraconvex Multifunctions. Set-Valued Var. Anal . 19 (3), 487-504 .]Search in Google Scholar
[Huang, H. (2012) Coderivative conditions for Error Bounds of γ-paraconvex Multifunctions. Set Valued Var. Anal. 20:567-579.]Search in Google Scholar
[Jofré, A., Luc, D.T. and Théra, M. (1998) ε-Subdifferential and ε-monoto-nicity. Nonlinear Analysis, 33, 71-90.]Search in Google Scholar
[Jourani, A. (1996) Subdifferentiability and subdifferential monotonicity of γ-paraconvex functions. Control and Cybernetics 25, 721-737.]Search in Google Scholar
[Lasry, J.M and Lions, P.L. (1986) A remark on regularization in Hilbert spaces. Israel. J. Math., 55, 257-266.]Search in Google Scholar
[Lebourg, G. (1979) Generic differentiability of Lipschitzian functions. Trans. Amer. Math. Soc . 256, 125-144.]Search in Google Scholar
[Luc, D.T., Ngai, H.V. and Théra, M. (1999) On ε-convexity and ε-monoto-nocity. In: A. Ioffe, S. Reich and I. Shafrir (eds), Calculus of Variation and Differential Equations. Research Notes in Math. Chapman & Hall, 82-100.]Search in Google Scholar
[Mokhtar-Kharroubi, H. (1985) Fonction d’appui á un ensemble et Analyse Multivoque. Preprint ANO 154. Lille I.]Search in Google Scholar
[Mokhtar-Kharroubi, H. (1987) Sur quelques Fonctions Marginales et leurs Applications. Chapitre I de Thése de Doctorat és Sciences (Lille I), France.]Search in Google Scholar
[Mokhtar-Kharroubi, H. (2017) Convex and convex-like optimization over a range inclusion problem and first applications. Decisions in Economics and Finance, 40(1).]Search in Google Scholar
[Ngai, H.V., Luc, D.T. and Théra, M. (2000) Approximate convex functions. J. Nonlinear Convex Anal, 1(2), 155-176.]Search in Google Scholar
[Ngai, H.V. and Penot, J.P. (2008) Paraconvex functions and paraconvex sets. Studia Math. 184 (1), 1-29.]Search in Google Scholar
[Páles, Zs. (2008) Approximately Convex Functions. Summer School on Generalized Convex Analysis, Kaohsiung, Taiwan, July 15-19, 2008. www:genconv.org/files/Kaohsiung_Pales2.pdf]Search in Google Scholar
[Penot, J.P. (1996) Favorable classes of Mapping and Multimapping in Nonlinear Analysis and Optimization. J. Convex Analysis, 3 (1), 97-116.]Search in Google Scholar
[Penot, J.P. and Volle, M. (1990) On strongly convex and paraconvex dualities. In: Generalized Convexity and Fractional Programming with Economic Applications, Proc. Workshop. Pisa/Italy 1988. Lect. Notes Econ. Math. Syst., 345, 198-218.]Search in Google Scholar
[Rockafellar, R.T. (1982) Favorable classes of Lipschitz continuous functions in subgradient optimization. In: E. Nurminsky, ed., Progress in Nondifferentiable Optimization, IIASA, Austria, 125-144.]Search in Google Scholar
[Rolewicz, S. (1999) On α(.)-monotone multifunction and differentiability of γ-paraconvex functions. Studia Math. 133(1), 29-37.]Search in Google Scholar
[Rolewicz, S. (2000) On α()-paraconvex and strongly α()-paraconvex functions. Control and Cybernetics 29 (1), 367-377.]Search in Google Scholar
[Rolewicz, S. (2001) On uniformly approximate convex and strongly α-paraconvex functions. Control and Cybernetics 30(3), 323-330.]Search in Google Scholar
[Rolewicz, S. (2005) Paraconvex analysis. Control and Cybernetics 34(3), 951-965.]Search in Google Scholar
[Springarn, J.E. (1981) Submonotone subdifferential of Lipschitz functions. Trans. Amer.Math. Soc., 264, 77-89.]Search in Google Scholar
[Vial, J.P. (1983) Strong and weak convexity of sets and functions. Math. Oper. Res, 8 (2), 231-259.]Search in Google Scholar