Disjointly non-singular operators: Extensions and local variations

Abstract

The disjointly non-singular (DNS) operators T∈ L(E,Y) from a Banach lattice E to a Banach space Y are those operators which are strictly singular in no closed subspace generated by a disjoint sequence of non-zero vectors. When E is order continuous with a weak unit, E can be represented as a dense ideal in some L1(μ) space, and we show that each of T∈ DNS(E,Y) admits an extension T∈ DNS(L1(μ),PO) from which we derive that both T and T** are tauberian operators and that the operator Tco: E**/E Y**/Y induced by T** is an (into) isomorphism. Also, using a local variation of the notion of DNS operator, we show that the ultrapowers of T∈ DNS(E,Y) are also DNS operators. Moreover, when E contains no copies of c0 and admits a weak unit, we show that T∈ DNS(E,Y) implies T**∈ DNS(E**,Y**).