The normed and Banach envelopes of \(\text{weak }L^1\) (Q5937679)

The author considers the space \(\text{weak }L^1\), the gauge functional \(\rho\) and the null space \(N\) of \(\rho\). Moreover, \(W\) is the normed enveloped of the space \(\text{weak }L^1\). The main result of the paper is the remark, that \(\overline W\) (the Banach envelope of \(\text{weak }L^1\)) is isometrically lattice isomorphic to a sublattice of \(W\). Very important is the following theorem. Every rearrangement invariant space \(E\) on \([0,\infty)\) is isometrically lattice isomorphic to a sublattice of \(W\), (Theorem 7, p. 255). The paper contains also a few important and interesting lemmas and theorems.