Global Stability Results for the Weak Vector Variational Inequality
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Y. H. Cheng | D. L. Zhu | Daoli Zhu | D. L. Zhu | Y. Cheng
[1] Nicolas Hadjisavvas,et al. Existence theorems for vector variational inequalities , 1996, Bulletin of the Australian Mathematical Society.
[2] Changyu Wang,et al. Continuousization of the family of point-to-set maps and its applications , 1990 .
[3] G. Chen. Existence of solutions for a vector variational inequality: An extension of the Hartmann-Stampacchia theorem , 1992 .
[4] Bruce D. Craven,et al. A vector variational inequality and optimization over an efficient set , 1990, ZOR Methods Model. Oper. Res..
[5] F. Giannessi,et al. On the Theory of Vector Optimization and Variational Inequalities. Image Space Analysis and Separation , 2000 .
[6] G. Stampacchia,et al. On some non-linear elliptic differential-functional equations , 1966 .
[7] Chen Guang-ya,et al. The vector complementary problem and its equivalences with the weak minimal element in ordered spaces , 1990 .
[8] Jean-Pierre Crouzeix,et al. Characterizations of Generalized Convexity and Generalized Monotonicity, A Survey , 1998 .
[9] N. D. Yen,et al. Vector variational inequality as a tool for studying vector optimization problems , 1998 .
[10] J. Aubin,et al. Applied Nonlinear Analysis , 1984 .
[11] Hirotaka Nakayama,et al. Theory of Multiobjective Optimization , 1985 .
[12] S. J. Li,et al. Existence of solutions for a generalized vector quasivariational inequality , 1996 .
[13] Xiaoqi Yang,et al. Generalized convex functions and vector variational inequalities , 1993 .
[14] Patrice Marcotte,et al. New classes of generalized monotonicity , 1995 .