English

Semiprojective Banach lattices

Functional Analysis 2026-04-14 v1 Category Theory Operator Algebras

Abstract

We introduce a norm-controlled notion of semiprojectivity for Banach lattices, requiring liftability of contractive lattice homomorphisms through inductive limits of closed ideals with arbitrarily small loss of norm control. Our main result establishes that, for a compact metric space XX, the Banach lattice C(X)C(X) is semiprojective if and only if XX is an absolute neighbourhood retract. Notably, this characterisation is strictly more permissive than its CC^*-algebraic counterpart: by a theorem of S\orensen and Thiel, C(X)C(X) is semiprojective in the category of CC^*-algebras and *-homomorphisms if and only if XX is an ANR of dimension at most one. The dimensional obstruction disappears in the Banach-lattice setting because lattice homomorphisms between C(K)C(K)-spaces are automatically weighted composition operators, and therefore no commutation relations need to be lifted. We also show that uncountable 1\ell_1-sums of 1+1^+-projective Banach lattices with topological order units are semiprojective but need not be 1+1^+-projective, establishing that the two notions are genuinely distinct. On the negative side, we prove that p\ell_p and Lp([0,1])L_p([0,1]) for p(1,)p \in (1,\infty) as well as Orlicz spaces are not semiprojective.

Keywords

Cite

@article{arxiv.2604.10624,
  title  = {Semiprojective Banach lattices},
  author = {Tomasz Kania and Mariusz Niwiński},
  journal= {arXiv preprint arXiv:2604.10624},
  year   = {2026}
}

Comments

19 pp

R2 v1 2026-07-01T12:05:00.046Z