Order ideals in order smooth p-normed spaces

Abstract

We generalize the notion of M-ideals in order smooth ∞-normed spaces to "smooth p-order ideals" in order smooth p-normed spaces. We show that if V is an order smooth p-normed space and W is a closed subspace of V, then W is a smooth p-order ideal in V if and only if W is a smooth p'-order ideal in order smooth p'-normed space if and only if W is a smooth p-order ideal in order smooth p-normed space V**. We prove that every L-summand in order smooth 1-normed space is a smooth 1-order ideal. We find a condition under which every M-ideal in order smooth ∞-normed space is a smooth ∞-order ideal. We show that every M-ideal in order smooth ∞-normed space is smooth ∞-order ideal.