The SHAI property for the operators on Lp
Abstract
A Banach space X has the SHAI (surjective homomorphisms are injective) property provided that for every Banach space Y, every continuous surjective algebra homomorphism from the bounded linear operators on X onto the bounded linear operators on Y is injective. The main result gives a sufficient condition for X to have the SHAI property. The condition is satisfied for Lp (0, 1) for 1 < p < ∞, spaces with symmetric bases that have finite cotype, and the Schatten p-spaces for 1 < p < ∞.
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