Geometry of the unit sphere in polynomial spaces / Jesús Ferrer, Domingo García, Manuel Maestre, Gustavo A. Muñoz, Daniel L. Rodríguez, Juan B. Seoane.
Ferrer, Jesús.; Garcia, Domingo, 1958 January 7-; Maestre, Manuel.; Muñoz Cuenca, Gustavo Adolfo.; Rodríguez, Daniel L.; Seoane, Juan B.
2022
QA320
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Title
Geometry of the unit sphere in polynomial spaces / Jesús Ferrer, Domingo García, Manuel Maestre, Gustavo A. Muñoz, Daniel L. Rodríguez, Juan B. Seoane.
Author
Ferrer, Jesús.
ISBN
9783031236761 (electronic bk.)
3031236769 (electronic bk.)
9783031236754
3031236750
DOI
https://doi.org/10.1007/978-3-031-23676-1
Publication Details
Cham : Springer, 2022.
Language
English
Description
1 online resource (140 p.).
Item Number
10.1007/978-3-031-23676-1 doi
Call Number
QA320
Dewey Decimal Classification
515.7
Summary
This brief presents a global perspective on the geometry of spaces of polynomials. Its particular focus is on polynomial spaces of dimension 3, providing, in that case, a graphical representation of the unit ball. Also, the extreme points in the unit ball of several polynomial spaces are characterized. Finally, a number of applications to obtain sharp classical polynomial inequalities are presented. The study performed is the first ever complete account on the geometry of the unit ball of polynomial spaces. Nowadays there are hundreds of research papers on this topic and our work gathers the state of the art of the main and/or relevant results up to now. This book is intended for a broad audience, including undergraduate and graduate students, junior and senior researchers and it also serves as a source book for consultation. In addition to that, we made this work visually attractive by including in it over 50 original figures in order to help in the understanding of all the results and techniques included in the book.
Bibliography, etc. Note
Includes bibliographical references.
Access Note
Access limited to authorized users.
Source of Description
Online resource; title from PDF title page (SpringerLink, viewed March 23, 2023).
Added Author
Garcia, Domingo, 1958 January 7-
Maestre, Manuel.
Muñoz Cuenca, Gustavo Adolfo.
Rodríguez, Daniel L.
Seoane, Juan B.
Series
SpringerBriefs in mathematics.
Available in Other Form
Geometry of the Unit Sphere in Polynomial Spaces
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Intro
Contents
1 Introduction
2 Polynomials of Degree n
2.1 On the Real Line
2.1.1 Polynomials Bounded by a Majorant
2.2 On the Complex Plane
3 Spaces of Trinomials
3.1 On the Real Line with the Supremum Norm
3.1.1 The Geometry of Bm,n,[infinity] for Odd Numbers m,n
3.1.2 The Geometry of Bm,n,[infinity] for m Odd and n Even
3.1.3 The Geometry of Bm,n,[infinity] for m Even and n Odd
3.1.4 The Geometry of Bm,n,[infinity] for Even Numbers m,n
3.2 On the Real Line with the Lp-Norm
3.3 On the Real Plane
3.3.1 The Geometry of B2n,n,[infinity],2 for n Odd

6 Polynomials with the Hexagonal and Octagonal Norms
6.1 Octagonal Norm
6.2 Hexagonal Norm
7 Hilbert Spaces
7.1 The Real and Complex Case for 2-Homogeneous Polynomials
7.2 Polynomials of Degree n
8 Banach Spaces
8.1 Integral and Nuclear Polynomials
8.2 Orthogonally Additive Polynomials
9 Applications
9.1 Bernstein-Markov Type Inequalities
9.2 Polarization Constants
9.3 Unconditional Constants
9.4 Bohnenblust-Hille and Hardy-Littlewood Constants
9.4.1 On the Complex Case
9.4.2 On the Real Case
References

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