Injective Tauberian operators on L1 and operators with dense range on ∞
Abstract
There exist injective Tauberian operators on L1(0,1) that have dense, non closed range. This gives injective, non surjective operators on ∞ that have dense range. Consequently, there are two quasi-complementary, non complementary subspaces of ∞ that are isometric to ∞.
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