Journal of Mathematical Extension (Dec 2014)
Characterization of Best Approximation Points with Lattice Homomorphisms
Abstract
In this paper we prove some characterization theorems in the theory of best approximation in Banach lattices. We use a new idea for finding the best approximation points in an ideal. We find the distance between an ideal I and an element x by using lattice homomorphisms. We introduce maximal ideals of an AM space and characterize other ideals by the maximal ideals. We also give a new representation for principle ideals in Banach lattices that is a majorizing subspace and we show that these principle ideals are proximinal. The role of lattice homomorphisms in this paper is very important
