The following pages link to (Q4928083):
Displaying 20 items.
- The problem of isometric extension in the unit sphere of the space \(s_p(\alpha,H)\) (Q380305) (← links)
- The isometric extension problem in the unit spheres of \(l^p(\Gamma)(p>1)\) type spaces (Q551784) (← links)
- Isometries on the quasi-Banach spaces \(L^p\) \((0 < p < 1)\) (Q606302) (← links)
- The problem of isometric extension in the unit sphere of the space \(s_p(\alpha )\) (Q611181) (← links)
- On extension of isometries on the unit spheres of \(L^p\)-spaces for \(0 < p \leq 1\) (Q642560) (← links)
- Extension of isometries on unit sphere of \(L^\infty\) (Q717741) (← links)
- On extension of isometries between the unit spheres of normed space \(E\) and \(l^p\) \((p > 1)\) (Q839738) (← links)
- On extension of isometries between unit spheres of \(L_{p}(\mu )\) and \(L_{p}(\nu ,H)\) (\(1< p \neq 2\), \(H\) is a Hilbert space) (Q855415) (← links)
- Extension of isometries between the unit spheres of normed space \(E\) and \(C(\Omega)\) (Q882754) (← links)
- Uniqueness of rotation invariant norms (Q958866) (← links)
- Extension of isometries on the unit sphere of \(l ^{p }(\Gamma )\) space (Q977272) (← links)
- Extension of isometries on the unit sphere of \(L^p\) spaces (Q1757986) (← links)
- Every infinite-dimensional Hilbert space is real-analytically isomorphic with its unit sphere (Q1908119) (← links)
- Extension of isometries between the unit spheres of \(p\)-normed spaces (Q2120577) (← links)
- On isometric extension in the space \(s_n(H)\) (Q2256678) (← links)
- Uniqueness of the extension of isometries on the unit spheres in normed linear spaces (Q2341673) (← links)
- The problem of isometric extension on the unit sphere of the space \(l\cap l^p(H)\) for \(0 < p < 1\) (Q2346164) (← links)
- Extension of isometries between the unit spheres of \(l^p (\Gamma)\) (\(1<p<\infty\)) and a Banach space \(E\). (Q2917098) (← links)
- (Q5197886) (← links)
- Isometry and phase-isometry of non-Archimedean normed spaces (Q6068760) (← links)
