1. Anh P. N.: An interior proximal method for solving pseudomonotone nonlipschitzian multivalued variational inequalities, Nonlinear Analysis Forum, 14, 27–42 (2009).
2. Anh P. N.: An interior proximal method for solving monotone generalized variational inequalities, East-West Journal of Mathematics, 10, 81–100 (2008).
3. Anh P. N., and Muu L. D.: Coupling the Banach contraction mapping principle and the proximal point algorithm for solving monotone variational inequalities, Acta Mathematica Vietnamica, 29, 119–133 (2004).
4. Anh P. N., Muu L. D., and Strodiot J. J.: Generalized Projection Method for Non-Lipschitz Multivalued Monotone Variational Inequalities, Acta Mathematica Vietnamica, 34, 67–79 (2009).
5. Anh P. N., Muu L.D., Nguyen V. H., and Strodiot J. J.: On the Contraction and Nonexpensiveness Properties of the Marginal Mappings in Generalized Variational Inequalities Involving Co-coercive Operators. In: Eberhard, A., Hadjisavvas, N. and Luc, D. T. (ed) Generalized Convexity and Monotonicity. Springer (2005).