-completely continuous operators and -Schur Banach spaces

Abstract

For each ordinal 0≤slant ≤slant ω1, we introduce the notion of a -completely continuous operator and prove that for each ordinal 0< < ω1, the class V of -completely continuous operators is a closed, injective operator ideal which is not surjective, symmetric, or idempotent. We prove that for distinct 0≤slant , ζ≤slant ω1, the classes of -completely continuous operators and ζ-completely continuous operators are distinct. We also introduce an ordinal rank v for operators such that v(A)=ω1 if and only if A is completely continuous, and otherwise v(A) is the minimum countable ordinal such that A fails to be -completely continuous. We show that there exists an operator A such that v(A)= if and only if 1≤slant ≤slant ω1, and there exists a Banach space X such that v(IX)= if and only if there exists an ordinal γ≤slant ω1 such that =ωγ. Finally, prove that for every 0<<ω1, the class \A∈ L: v(A) ≥slant \ is 11-complete in L, the coding of all operators between separable Banach spaces. This is in contrast to the class V L, which is 21-complete in L.