Approximately multiplicative maps between algebras of bounded operators on Banach spaces
Abstract
We show that for any separable reflexive Banach space X and a large class of Banach spaces E, including those with a subsymmetric shrinking basis but also all spaces Lp for 1≤ p ≤ ∞, every bounded linear map B(E) B(X) which is approximately multiplicative is necessarily close in the operator norm to some bounded homomorphism B(E) B(X). That is, the pair ( B(E), B(X)) has the AMNM property in the sense of Johnson (J.~London Math.\ Soc. 1988). Previously this was only known for E=X=p with 1<p<∞; even for those cases, we improve on the previous methods and obtain better constants in various estimates. A crucial role in our approach is played by a new result, motivated by cohomological techniques, which establishes AMNM properties relative to an amenable subalgebra; this generalizes a theorem of Johnson (op cit.).
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