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ALGEBRAIC ISOMORPHISMS AND FINITE DISTRIBUTIVE SUBSPACE LATTICES
Published online by Cambridge University Press: 01 June 1999
Abstract
Let [Lscr ]1 and [Lscr ]2 be finite distributive subspace lattices on real or complex Banach spaces. It is shown that every rank-preserving algebraic isomorphism of Alg[Lscr ]1 onto Alg[Lscr ]2 is quasi-spatially induced. If the algebraic isomorphism in question is known only to preserve the rank of rank one operators, then it induces a lattice isomorphism between [Lscr ]1 and [Lscr ]2.
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- The London Mathematical Society 1999
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