The author uses the notion of D-J-antiresolvent mapping to introduce classes of D-J-monotone, D-J-pseudo-monotone and D-J-coercive multi-valued mappings in reflexive Banach spaces. Moreover, some results pertinent to nonlinear inclusion equations are proved. Two points have been concluded in the case of gradient mappings: first, the above mentioned classes are reduced to monotonicity, pseudo-monotonicity and coercivity; second, related results correspond to well known results in the literature.

• 出版日期2015-9