On linear operators with s-nuclear adjoints: 0< s 1
Abstract
If s∈ (0,1] and T is a linear operator with s-nuclear adjoint from a Banach space X to a Banach space Y and if one of the spaces X* or Y*** has the approximation property of order s, APs, then the operator T is nuclear. The result is in a sense exact. For example, it is shown that for each r∈ (2/3, 1] there exist a Banach space Z0 and a non-nuclear operator T: Z0** Z0 so that Z0** has a Schauder basis, Z0*** has the APs for every s∈ (0,r) and T* is r-nuclear.
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