The norming sets of P(2 R2h(1/2))

Sung Guen Kim

The norming sets of P(² R²_h(1/2))

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1 Scopus citations

Abstract

Let n ∈ N. An element x ∈ E is called a norming point of P ∈ P(ⁿ E) if ‖x‖ = 1 and |P (x)| = ‖P ‖, where P(ⁿ E) denotes the space of all continuous n-homogeneous polynomials on E. For P ∈ P(ⁿ E), we define.

Original language	English
Pages (from-to)	540-547
Number of pages	8
Journal	Palestine Journal of Mathematics
Volume	12
Issue number	2
State	Published - 2023

Keywords

2-homogeneous polynomials
Norming points
the plane with a hexagonal norm

Cite this

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abstract = "Let n ∈ N. An element x ∈ E is called a norming point of P ∈ P(n E) if ‖x‖ = 1 and |P (x)| = ‖P ‖, where P(n E) denotes the space of all continuous n-homogeneous polynomials on E. For P ∈ P(n E), we define.",

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N2 - Let n ∈ N. An element x ∈ E is called a norming point of P ∈ P(n E) if ‖x‖ = 1 and |P (x)| = ‖P ‖, where P(n E) denotes the space of all continuous n-homogeneous polynomials on E. For P ∈ P(n E), we define.

AB - Let n ∈ N. An element x ∈ E is called a norming point of P ∈ P(n E) if ‖x‖ = 1 and |P (x)| = ‖P ‖, where P(n E) denotes the space of all continuous n-homogeneous polynomials on E. For P ∈ P(n E), we define.

KW - 2-homogeneous polynomials

KW - Norming points

KW - the plane with a hexagonal norm

UR - https://www.scopus.com/pages/publications/85166760111

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SP - 540

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The norming sets of P(² R²_h(1/2))

Abstract

Keywords

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