Unbounded σ-order-to-norm continuous and un-continuous operators

Abstract

An operator T from a vector lattice E into a normed lattice F is called unbounded σ-order-to-norm continuous whenever xnuo0 implies \| Txn\|→ 0, for each sequence (xn)n⊂eq E. For a net (xα)α⊂eq E, if xαun0 implies Txαun0, then T is called an unbounded norm continuous operator. In this manuscript, we study some properties of these classes of operators and their relationships with the other classes of operators.