Free complex Banach lattices

Abstract

The construction of the free Banach lattice generated by a real Banach space is extended to the complex setting. It is shown that for every complex Banach space E there is a complex Banach lattice FBL C[E] containing a linear isometric copy of E and satisfying the following universal property: for every complex Banach lattice X C, every operator T:E→ X C admits a unique lattice homomorphic extension T:FBL C[E]→ X C with \|T\|=\|T\|. The free complex Banach lattice FBL C[E] is shown to have analogous properties to those of its real counterpart. However, examples of non-isomorphic complex Banach spaces E and F can be given so that FBL C[E] and FBL C[F] are lattice isometric. The spectral theory of induced lattice homomorphisms on FBL C[E] is also explored.

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