Abstract
We study the class of Banach lattices that are positively polynomially Schur. Plenty of examples and counterexamples are provided, lattice properties of this class are proved, arbitrary L p ( μ ) L_p(\mu ) -spaces, 1 ≤ p > ∞ 1 \leq p > \infty , are shown to be positively polynomially Schur, lattice analogues of results on Banach spaces are obtained and relationships with the positive Schur and the weak Dunford-Pettis properties are established.
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