Set-valued Lyapunov functions for difference inclusions

In this paper, the following inclusion sets are under certain conditions presented for singular values of a where a i = |a ii | and P i (A) := {j |a ij / = 0 or a ji / = 0, j / = i} for any i ∈ {1, 2, . . . , n}, ρ(B) and C(A) denote the Perron root of the nonnegative matrix B =[b ij ] satisfying |

In this paper, generalizing the concept of cone convexity, we have defined cone preinvexity for set-valued functions and given an example in support of this generalization. A Farkas᎐Minkowski type theorem has been proved for these functions. A Lagrangian type dual has been defined for a fractional p

In this paper the existence of Lyapunov functions for second-order differential inclusions is analyzed by using the methodology of the Viability Theory. A necessary assumption on the initial states and sufficient conditions for the existence of local and global Lyapunov functions are obtained. An ap

In this note, a general cone separation theorem between two subsets of image space is presented. With the aid of this, optimality conditions and duality for vector optimization of set-valued functions in locally convex spaces are discussed.