The J-sum of Banach spaces

Let (XJF-1 be a sequence of infinite-dimensional BANACH spaces. We prove that 00 @ X, has a non-locally complete quotient if XI is not quasi-reflexive.

We give a negative answer to the three-space problem for the Banach space properties to be complemented in a dual space and to be isomorphic to a dual space (solving a problem of Vogt [Lectures held in the Functional Analysis Seminar, DusseldorfÂWuppertal, Jan Feb. 1987] and another posed by D@ az e

## Abstract In the present paper we give conditions for Banach spaces of absolutely __p__‐summing operators to have unconditional bases. In this case we obtain methods to estimate the π~__p__~‐norm. Also we consider spaces of absolutely __p__‐summing operators with “bad” structure, i.e., without lo

1. Introduction. Let (X,) be a sequence of real valued independent and identically distributed random variables (r. v.) with espactation 0 and finite second moment 02. Further, let ( N n ) be a sequence of random integers satisfying N,/n -. t where z is a positive r.v. Then the celebrated result of