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

Authors

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

DOI

-

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)).

Keywords

Integral operators, Ultraproducts of spaces and maps.

First Page

475

Last Page

490

Recommended Citation

PALACİO, P. GOMEZ; MOLINA, J. A. LOPEZ; and RIVERA, M. J. (2001) "Some Applications of the Lattice Finite Representability in Spaces of Measurable Functions," Turkish Journal of Mathematics: Vol. 25: No. 4, Article 3. Available at: https://journals.tubitak.gov.tr/math/vol25/iss4/3