The norming set of a symmetric \(n\)-linear form on the plane with a rotated supremum norm for \(n=3, 4, 5\)
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Publication:6617102
DOI10.4134/ckms.c230286MaRDI QIDQ6617102
Publication date: 10 October 2024
Published in: Communications of the Korean Mathematical Society (Search for Journal in Brave)
Cites Work
- The norming set of a symmetric bilinear form on the plane with the supremum norm
- A proof that every Banach space is subreflexive
- Norm or Numerical Radius Attaining Multilinear Mappings and Polynomials
- The norming set of a symmetric 3-linear form on the plane with the $l_1$-norm
- The norming sets of $${{\mathcal {L}}}(^2 {\mathbb {R}}^2_{h(w)})$$
- The norming sets of ℒ( 2ℓ1 2) and ℒS( 2ℓ1 3)
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