c0 can be renormed to have the fixed point property for affine nonexpansive mappings
From MaRDI portal
Publication:5086767
DOI10.2298/FIL1816645NzbMath1499.46040MaRDI QIDQ5086767
Publication date: 7 July 2022
Published in: Filomat (Search for Journal in Brave)
nonexpansive mappingfixed point propertyaffine mappingrenormingasymptotically isometric \(c_0\)-summing basic sequenceclosed bounded convex set
Fixed-point theorems (47H10) Geometry and structure of normed linear spaces (46B20) Banach sequence spaces (46B45) Duality and reflexivity in normed linear and Banach spaces (46B10)
Related Items (2)
Unnamed Item ⋮ Fixed point properties for Lorentz sequence spaces \(\ell_{\rho,\infty}^0\) and \(\ell_{\rho,1}\)
Cites Work
- Unnamed Item
- Renormings and fixed point property in non-commutative \(L_1\)-spaces. II: Affine mappings
- The closed, convex hull of every ai \(c_{0}\)-summing basic sequence fails the FPP for affine nonexpansive mappings
- On the structure of the set of equivalent norms on \(\ell _{1}\) with the fixed point property
- Banach spaces with a basis that are hereditarily asymptotically isometric to \(l_1\) and the fixed point property
- Characterization of Banach spaces of continuous vector valued functions with the weak Banach-Saks property
- Some fixed point results in \(\ell^1\) and \(c_0\)
- There is an equivalent norm on \(\ell_1\) that has the fixed point property
- A renorming of some nonseparable Banach spaces with the fixed point property
- Reflexivity is equivalent to the perturbed fixed point property for cascading nonexpansive maps in Banach lattices
- On bases and unconditional convergence of series in Banach spaces
- Irregular convex sets with fixed-point property for nonexpansive mappings
- Property (M), M-ideals, and almost isometric structure of Banach spaces.
- Every nonreflexive subspace of $L_1[0,1$ fails the fixed point property]
- Semi-strongly Asymptotically Non-Expansive Mappings and Their Applications on Fixed Point Theory
This page was built for publication: c0 can be renormed to have the fixed point property for affine nonexpansive mappings
