X. X. Huang
According to our database1,
X. X. Huang
authored at least 29 papers
between 1998 and 2014.
Collaborative distances:
Collaborative distances:
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Bibliography
2014
Calmness and Exact Penalization in Vector Optimization under Nonlinear Perturbations.
J. Optim. Theory Appl., 2014
Characterizing the Nonemptiness and Compactness of the Solution Set of a Vector Variational Inequality by Scalarization.
J. Optim. Theory Appl., 2014
2013
Characterizations of the nonemptiness and compactness for solution sets of convex set-valued optimization problems.
J. Glob. Optim., 2013
Convergence of a class of penalty methods for constrained scalar set-valued optimization.
J. Glob. Optim., 2013
2012
Levitin-Polyak Well-Posedness for Optimization Problems with Generalized Equilibrium Constraints.
J. Optim. Theory Appl., 2012
J. Optim. Theory Appl., 2012
Generalized weak sharp minima in cone-constrained convex optimization with applications.
Comput. Optim. Appl., 2012
2009
Levitin-Polyak well-posedness of variational inequality problems with functional constraints.
J. Glob. Optim., 2009
2008
Levitin-Polyak well-posedness in generalized vector variational inequality problem with functional constraints.
Math. Methods Oper. Res., 2008
2007
J. Glob. Optim., 2007
2006
SIAM J. Optim., 2006
Partial Augmented Lagrangian Method and Mathematical Programs with Complementarity Constraints.
J. Glob. Optim., 2006
Convergence Analysis of a Class of Penalty Methods for Vector Optimization Problems with Cone Constraints.
J. Glob. Optim., 2006
Comput. Optim. Appl., 2006
2005
2004
Lower-order penalty methods for mathematical programs with complementarity constraints.
Optim. Methods Softw., 2004
2003
Partially Strictly Monotone and Nonlinear Penalty Functions for Constrained Mathematical Programs.
Comput. Optim. Appl., 2003
2002
Nonlinear Lagrangian for Multiobjective Optimization and Applications to Duality and Exact Penalization.
SIAM J. Optim., 2002
J. Glob. Optim., 2002
2001
SIAM J. Optim., 2001
Math. Methods Oper. Res., 2001
Math. Methods Oper. Res., 2001
J. Glob. Optim., 2001
2000
Math. Methods Oper. Res., 2000
Equivalents of a general approximate variational principle for set-valued maps and application to efficiency.
Math. Methods Oper. Res., 2000
1999
Equivalents of an approximate variational principle for vector-valued functions and applications.
Math. Methods Oper. Res., 1999
1998
A unified approach to the existing three types of variational principles for vector valued functions.
Math. Methods Oper. Res., 1998
Math. Methods Oper. Res., 1998
Math. Methods Oper. Res., 1998