Lp+L∞ and Lp L∞ are not isomorphic for all 1 p<∞, p 2

Abstract

Isomorphic classification of symmetric spaces is an important problem related to the study of symmetric structures in arbitrary Banach spaces. This research was initiated in the seminal work of Johnson, Maurey, Schechtman and Tzafriri (JMST, 1979). Somewhat later it was extended by Kalton to lattice structures (1993). In particular, in JMST (see also Lindenstrauss-Tzafriri book [1979, Section 2.f]) it was shown that the space L2 Lp for 2 ≤ p < ∞ (resp. L2+Lp for 1 < p ≤ 2) is isomorphic to Lp. A detailed investigation of various properties of separable sums and intersections of Lp-spaces (i.e., with p<∞) was undertaken by Dilworth in the papers from 1988 and 1990. In contrast to that, we focus here on the problem if the nonseparable spaces Lp +L∞ and Lp L∞, 1 p<∞, are isomorphic or not. We prove that these spaces are not isomorphic if 1 ≤ p < ∞, p ≠ 2. It comes as a consequence of the fact that the space Lp L∞, 1 p<∞, p 2, does not contain a complemented subspace isomorphic to Lp. In particular, as a subproduct, we show that Lp L∞ contains a complemented subspace isomorphic to l2 if and only if p = 2. The problem if L2 +L∞ and L2 L∞ are isomorphic or not remains open.