Scalarization and well-posedness for set optimization using Coradiant sets


Bin Yao, Sheng Jie Li




The aim of this paper is to study scalarization and well-posedness for a set-valued optimization problem with order relations induced by a Coradiant set. We introduce the notions of the set criterion solution for this problem and obtain some characterizations for these solutions by means of nonlinear scalarization. The scalarization function is a generalization of the scalarization function introduced by Khoshkhabar-amiranloo and Khorram. Moveover, we define the pointwise notions of LP well-posedness, strong DH-well-posedness and strongly B-well-posedness for the set optimization problem and characterize these properties through some scalar optimization problem based on the generalized nonlinear scalarization function respectively,