Subspaces of $L^{1}$ containing $L^{1}$

Orthogonally Additive Operators on Vector Lattices, A lattice approach to narrow operators, Some geometric aspects of operators acting from \(L_{1}\), Operators on the stopping time space, Factorization in \(\mathrm{SL}^{\infty}\), The size of \(L^ p\)-improving measures, On sign embeddings and narrow operators on 𝐿₂, Domination problems for strictly singular operators and other related classes, Representation of commutators on Schatten \(p\)-classes, Representation theorems for regular operators, A characterization of non-Dunford-Pettis operators on \(L^ 1\)., Strategically reproducible bases and the factorization property, A new class of \(L^ 1-\)spaces, Rearrangements with supporting trees, isomorphisms and shift operators, Narrow operators on lattice-normed spaces, On Nonseparable Banach Spaces, Narrow and \(\ell_2\)-strictly singular operators from \(L_p\), Commutators on 𝐿_{𝑝}, 1≤𝑝<∞, On the Representation of Order Continuous Operators by Random Measures, Ideals in \(L(L_1)\), Embedding \(L_1\) in a Banach lattice, The strong property (B) for \(L_p\) spaces, Commutators on \(\ell _1\), On the structure of non-weakly compact operators on Banach lattices, Martingales, \(G_{delta}\)-embeddings and quotients of \(L_1\)., Factorisation in stopping-time Banach spaces: identifying unique maximal ideals, Geometric aspects of the Daugavet property, Applications of the theory of semi-embeddings to Banach space theory, The space is primary for 1 < p < ∞, Decompositions of Banach Lattices into Direct Sums