Local derivation on some class of subspace lattice algebras
Abstract
Let H be a separable Hilbert space and L0⊂ B(H) a complete reflexive lattice. Let K be the direct sum of n0 copies of H (n0∈N and n0≥ 2) or the direct sum of countably infinite many copies of H respectively. We construct two class of subspace lattices L on K. Let AlgL be the corresponding subspace lattice algebra. We show that every local derivation from AlgL into B(K) is a derivation.
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