On extension of norm-additive maps between the positive unit spheres of \(\ell_q (\ell_p)\)
From MaRDI portal
Publication:6127009
DOI10.1007/s00025-024-02154-yOpenAlexW4393865836MaRDI QIDQ6127009
Publication date: 10 April 2024
Published in: Results in Mathematics (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1007/s00025-024-02154-y
Cites Work
- Unnamed Item
- Unnamed Item
- Unnamed Item
- Unnamed Item
- Unnamed Item
- Isometries on the unit sphere of the \(\ell_1\)-sum of strictly convex normed spaces
- Real-linear isometries and jointly norm-additive maps on function algebras
- Tingley's problem on finite von Neumann algebras
- On a generalized Mazur-Ulam question: Extension of isometries between unit spheres of Banach spaces
- On extension of isometries on the unit spheres of \(L^p\)-spaces for \(0 < p \leq 1\)
- Extension of isometries between unit spheres of finite-dimensional polyhedral Banach spaces
- Extension of isometries on unit sphere of \(L^\infty\)
- Tingley's problem through the facial structure of operator algebras
- Norm-linear and norm-additive operators between uniform algebras
- On isometric extension problem between two unit spheres
- Norm-additive maps on the positive definite cone of a \(C^{*}\)-algebra
- On the extension of isometries between the unit spheres of von Neumann algebras
- A solution to Tingley's problem for isometries between the unit spheres of compact \(\mathrm C^*\)-algebras and \(\mathrm {JB}^*\)-triples
- On the unit sphere of positive operators
- Extension of isometries on the unit sphere of \(L^p\) spaces
- Low rank compact operators and Tingley's problem
- Isometries of the unit sphere
- On a variant of Tingley's problem for some function spaces
- Tingley's problem through the facial structure of an atomic \(JBW^*\)-triple
- Maps preserving the norm of the positive sum in \(L_p\) spaces
- The Mazur-Ulam property in \(\ell_\infty\)-sum and \(c_0\)-sum of strictly convex Banach spaces
- On norm-additive maps between the maximal groups of positive continuous functions
- Tingley's problem for spaces of trace class operators
- On extension of isometries between unit spheres of \(\mathcal L^{\infty}(\Gamma)\)-type space and a Banach space \(E\)
- Transition probabilities of normal states determine the Jordan structure of a quantum system
- ISOMETRIES BETWEEN UNIT SPHERES OF THE -SUM OF STRICTLY CONVEX NORMED SPACES
- Isometries and relative entropy preserving maps on density operators
- A survey on Tingley’s problem for operator algebras
- Normal states are determined by their facial distances
- Isometries of quantum states
- On the extension of isometries between the unit spheres of a C*-algebra and 𝐵(𝐻)
- Isometries of spaces of normalized positive operators under the operator norm
- Spectral characterization of Jordan--Segal isomorphisms of quantum observables
- Isometries on positive operators of unit norm
This page was built for publication: On extension of norm-additive maps between the positive unit spheres of \(\ell_q (\ell_p)\)
