Free quasi-Banach lattices
Abstract
We study different versions of free objects in the setting of quasi-Banach spaces and quasi-Banach lattices. Special attention is devoted to the free p-convex p-Banach lattice FpBL(p)[E] generated by a p-natural quasi-Banach space E, for which we provide a functional representation by means of operators into Lp[0,1]. This representation yields, among other consequences: (1) Operators from a Banach space E to any p-convex (0<p<1) quasi-Banach lattice X can be extended to lattice homomorphisms FBL[E] X with control of the norm. (2) The space p() (0<p<1) is a projective p-Banach lattice precisely when is countable. (3) The free vector lattice generated by E sits inside FpBL(p)[E] as a dense sublattice.
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