A modern look at algebras of operators on \(L^p\)-spaces
From MaRDI portal
Publication:2238901
DOI10.1016/j.exmath.2020.10.003zbMath1487.22006arXiv1909.12096OpenAlexW3097592910MaRDI QIDQ2238901
Publication date: 2 November 2021
Published in: Expositiones Mathematicae (Search for Journal in Brave)
Full work available at URL: https://arxiv.org/abs/1909.12096
Representations of groups, semigroups, etc. (aspects of abstract harmonic analysis) (43A65) (L^p)-spaces and other function spaces on groups, semigroups, etc. (43A15) Representations of group algebras (22D20) Algebras of operators on Banach spaces and other topological linear spaces (47L10)
Related Items (7)
A note on the \(p\)-operator space structure of the \(p\)-analog of the Fourier-Stieltjes algebra ⋮ Isomorphisms of algebras of convolution operators ⋮ Expanders are counterexamples to the \(\ell^p\) coarse Baum-Connes conjecture ⋮ Zero-product balanced algebras ⋮ Isomorphisms of Orlicz spaces ⋮ On the Takai duality for \(L^p\) operator crossed products ⋮ Rigidity of twisted groupoid \(L^p\)-operator algebras
Cites Work
- Unnamed Item
- Unnamed Item
- Unnamed Item
- Quotients of Banach algebras acting on \(L^{p}\)-spaces
- Convolution operators on groups
- On the isometries of certain function-spaces
- Group algebras acting on \(L^p\)-spaces
- Column and row operator spaces over \(\mathrm{QSL}_p\)-spaces and their use in abstract harmonic analysis
- A property of \(B_p(G)\). Applications to convolution operators
- Simple \(C^*\)-algebras generated by isometries
- On the ideal structure of some Banach algebras related to convolution operators on \(L^{p}(G)\)
- \(L^p\)-operator algebras with approximate identities. I
- Extending representations of Banach algebras to their biduals
- Representations of étale groupoids on \(L^p\)-spaces
- Banach algebras generated by an invertible isometry of an \(L^p\)-space
- Remarks on contractive projections in \(L_{p}\)-spaces
- Nonclassifiability of UHF $L^p$-operator algebras
- Tensor products of Leavitt path algebras
- The predual of the space of convolutors on a locally compact group
- $L^p$-operator algebras associated with oriented graphs
- Representations of $p$-convolution algebras on $L^q$-spaces
- On convoluters on $L^p$-spaces
- Cantor systems and quasi-isometry of groups
- Sets of $p$-uniqueness on noncommutative locally compact groups
- The Theory of p-Spaces with an Application to Convolution Operators
This page was built for publication: A modern look at algebras of operators on \(L^p\)-spaces
