Some Applications of the Lattice Finite Representability in Spaces of Measurable Functions

Authors

P. GOMEZ PALACİO
J. A. LOPEZ MOLINA
M. J. RIVERA

Abstract

We study the lattice finite representability of the Bochner space L_p(\mu_1,L_q(\mu_2)) in \ell_p{\ell_q}, 1 \le p,q < \infty, and then we characterize the ideal of the operators which factor through a lattice homomorphism between L_{\infty}(\mu) and L_p(\mu_1,L_q(\mu_2)).

DOI

-

Keywords

Integral operators, Ultraproducts of spaces and maps.

First Page

475

Last Page

490

Recommended Citation

PALACİO, P. G, MOLINA, J. A, & RIVERA, M. J (2001). Some Applications of the Lattice Finite Representability in Spaces of Measurable Functions. Turkish Journal of Mathematics 25 (4): 475-490. https://doi.org/-