Closed ideals in L(X) and L(X*) when X contains certain copies of p and c0
Abstract
Suppose X is a real or complexified Banach space containing a complemented copy of p, p∈(1,2), and a copy (not necessarily complemented) of either q, q∈(p,∞), or c0. Then L(X) and L(X*) each admit continuum many closed ideals. If in addition q≥ p', 1p+1p'=1, then the closed ideals of L(X) and L(X*) each fail to be linearly ordered. We obtain additional results in the special cases of L(1q) and L(p c0), 1<p<2<q<∞.
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