Add to ORKGNew concepts of relative monotonicity were introduced in Konnov (Oper Res Lett 28:21-26, 2001a) which extend the usual ones. These concepts enable us to establish new existence and uniqueness results for variational inequality problems over product sets. This paper presents first-order characterizations of new (generalized) monotonicity concepts. Specialized results are obtained for the affine case. © Springer-Verlag 2007
Some notions of generalized monotonicity for multi-valued mappings are characterized in terms of pro...
In this paper, we consider vector variational inequalities with set-valued mappings over product set...
This chapter solves the variational inequalities (or generalized equations). The chapter defines the...
New concepts of relative monotonicity were introduced in Konnov (Oper Res Lett 28:21-26, 2001a) whic...
New concepts of relative monotonicity were introduced in Konnov (Oper Res Lett 28:21-26, 2001a) whic...
New concepts of relative monotonicity were introduced in Konnov (OperResLett 28:21–26, 2001a) which ...
New concepts of relative monotonicity were introduced in Konnov (Oper Res Lett 28:21-26, 2001a) whic...
New concepts of monotonicity which are expected to be useful in investigating variational inequaliti...
New concepts of monotonicity which are expected to be useful in investigating variational inequaliti...
New concepts of monotonicity which are expected to be useful in investigating variational inequaliti...
AbstractIn this paper, we introduce a generalized quasi-monotone map and consider existence of solut...
The purpose of this paper is to introduce some new concept and extend the usual ones are introduced...
In this paper, we introduce the concept of relaxed (ρ-θ)-η-invariant monotonicity to establish the e...
AbstractIn this paper, three new classes of generalized monotone operators are introduced: the relax...
This paper introduces new classes of generalized invex monotone mappings and invex cocoercive mappi...
Some notions of generalized monotonicity for multi-valued mappings are characterized in terms of pro...
In this paper, we consider vector variational inequalities with set-valued mappings over product set...
This chapter solves the variational inequalities (or generalized equations). The chapter defines the...
New concepts of relative monotonicity were introduced in Konnov (Oper Res Lett 28:21-26, 2001a) whic...
New concepts of relative monotonicity were introduced in Konnov (Oper Res Lett 28:21-26, 2001a) whic...
New concepts of relative monotonicity were introduced in Konnov (OperResLett 28:21–26, 2001a) which ...
New concepts of relative monotonicity were introduced in Konnov (Oper Res Lett 28:21-26, 2001a) whic...
New concepts of monotonicity which are expected to be useful in investigating variational inequaliti...
New concepts of monotonicity which are expected to be useful in investigating variational inequaliti...
New concepts of monotonicity which are expected to be useful in investigating variational inequaliti...
AbstractIn this paper, we introduce a generalized quasi-monotone map and consider existence of solut...
The purpose of this paper is to introduce some new concept and extend the usual ones are introduced...
In this paper, we introduce the concept of relaxed (ρ-θ)-η-invariant monotonicity to establish the e...
AbstractIn this paper, three new classes of generalized monotone operators are introduced: the relax...
This paper introduces new classes of generalized invex monotone mappings and invex cocoercive mappi...
Some notions of generalized monotonicity for multi-valued mappings are characterized in terms of pro...
In this paper, we consider vector variational inequalities with set-valued mappings over product set...
This chapter solves the variational inequalities (or generalized equations). The chapter defines the...