Pages that link to "Item:Q1018683"
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The following pages link to On extension of isometries and approximate isometries between unit spheres (Q1018683):
Displaying 23 items.
- The isometric extension problem between unit spheres of two separable Banach spaces (Q272507) (← links)
- Some new properties and isometries on the unit spheres of generalized James spaces \(J_{p}\) (Q432400) (← links)
- On extension of isometries on the unit spheres of \(L^p\)-spaces for \(0 < p \leq 1\) (Q642560) (← links)
- Addendum to: ``\(\varepsilon\)-isometries in Euclidean spaces'' (Q884514) (← links)
- A note on extension of isometric embedding from a Banach space \(E\) into the universal space \(\ell _{\infty }(\Gamma )\) (Q1043918) (← links)
- Almost isometries on the unit ball of \(\ell _ 1\) (Q1117424) (← links)
- Extension of isometries on the unit sphere of \(L^p\) spaces (Q1757986) (← links)
- On isometric extension in the space \(s_n(H)\) (Q2256678) (← links)
- Sharp corner points and isometric extension problem in Banach spaces (Q2257216) (← links)
- A note on the Mazur-Ulam property of almost-CL-spaces (Q2257220) (← links)
- A remark on extension of into isometries (Q2266880) (← links)
- Isometries between normed spaces which are surjective on a sphere (Q2267718) (← links)
- On isometries between unit spheres of abstract \(M\) spaces (Q2725224) (← links)
- (Q3153945) (← links)
- Extension of embeddings close to isometries or similarities (Q3315748) (← links)
- (Q3434010) (← links)
- (Q3642447) (← links)
- (Q5868480) (← links)
- Extension of quasi-Hölder embeddings between unit spheres of \(p\)-normed spaces (Q6040500) (← links)
- On the quasi-Figiel problem and extension of \(\varepsilon\)-isometry on unit sphere of \(\mathcal{L}_{\infty, 1^+}\) space (Q6044203) (← links)
- On the Figiel type problem and extension of \(\varepsilon\)-isometry between unit spheres (Q6099784) (← links)
- The slice approximating property and Figiel-type problem on unit spheres (Q6143222) (← links)
- On isometries and Tingley’s problem for the spaces $T[\theta , \mathcal{S}_{\alpha }]$, $1 \leqslant\alpha \lt \omega _{1}$ (Q6180245) (← links)
