Norm attaining multilinear forms on the spaces $c_0$ or $l_1$

Sung Guen Kim

doi:10.33205/cma.981877

Research Article

Year 2022, Volume: 5 Issue: 1, 1 - 6, 14.03.2022

Sung Guen Kim

https://doi.org/10.33205/cma.981877

Abstract

References

M. D. Acosta, J. L. Dávila: A basis of $\mathbb{R}^n$ with good isometric properties and some applications to denseness of norm attaining operators, J. Funct. Anal., 279 (6) (2020), 108602, 26 pp.
R. M. Aron, C. Finet and E. Werner: Some remarks on norm-attaining n-linear forms, Function spaces (Edwardsville, IL, 1994), 19–28, Lecture Notes in Pure and Appl. Math., 172, Dekker, New York, (1995).
E. Bishop, R. Phelps: A proof that every Banach space is subreflexive, Bull. Amer. Math. Soc., 67 (1961), 97–98.
Y. S. Choi, S. G. Kim: Norm or numerical radius attaining multilinear mappings and polynomials, J. London Math. Soc., 54 (1) (1996), 135–147.
S. Dantas, M. Jung, O. Roldán and A. R. Zoca: Norm-attaining tensors and nuclear operators, to appear in Mediterr. J. Math. (2022). DOI: https://doi.org/10.1007/s00009-021-01949-5
S. Dineen: Complex Analysis on Infinite Dimensional Spaces, Springer-Verlag, London, (1999).
M. Jimenez Sevilla, R. Paya: Norm attaining multilinear forms and polynomials on preduals of Lorentz sequence spaces, Studia Math., 127 (1998), 99–112.
S. G. Kim: The geometry of ${\mathcal L}(^2l_{\infty}^2)$, Kyungpook Math. J., 58 (2018), 47–54.
S. G. Kim: The norming set of a polynomial in ${\mathcal P}(^2 l_{\infty}^2),$ , Honam Math. J., 42 (3) (2020), 569-576.
S. G. Kim: The norming set of a symmetric bilinear form on the plane with the supremum norm, Mat. Stud., 55 (2) (2021), 171–180.

Norm attaining multilinear forms on the spaces $c_0$ or $l_1$

Year 2022, Volume: 5 Issue: 1, 1 - 6, 14.03.2022

Sung Guen Kim

https://doi.org/10.33205/cma.981877

Abstract

$T \in L (^{n} E)$ is called a norming attaining if there are $x_{1}, \dots, x_{n} \in E$ such that $∥ x_{1} ∥ = \dots = ∥ x_{n} ∥ = 1$ and $|T (x_{1}, \dots, x_{n}) | = ∥ T ∥,$ where $L (^{n} E)$ denotes the space of all continuous $n$ -linear forms on $E .$ We investigate norm attaining multilinear forms on $c_{0}$ or $l_{1} .$

Keywords

norming attaining multilinear forms , norming points , norming sets

References

M. D. Acosta, J. L. Dávila: A basis of $\mathbb{R}^n$ with good isometric properties and some applications to denseness of norm attaining operators, J. Funct. Anal., 279 (6) (2020), 108602, 26 pp.
R. M. Aron, C. Finet and E. Werner: Some remarks on norm-attaining n-linear forms, Function spaces (Edwardsville, IL, 1994), 19–28, Lecture Notes in Pure and Appl. Math., 172, Dekker, New York, (1995).
E. Bishop, R. Phelps: A proof that every Banach space is subreflexive, Bull. Amer. Math. Soc., 67 (1961), 97–98.
Y. S. Choi, S. G. Kim: Norm or numerical radius attaining multilinear mappings and polynomials, J. London Math. Soc., 54 (1) (1996), 135–147.
S. Dantas, M. Jung, O. Roldán and A. R. Zoca: Norm-attaining tensors and nuclear operators, to appear in Mediterr. J. Math. (2022). DOI: https://doi.org/10.1007/s00009-021-01949-5
S. Dineen: Complex Analysis on Infinite Dimensional Spaces, Springer-Verlag, London, (1999).
M. Jimenez Sevilla, R. Paya: Norm attaining multilinear forms and polynomials on preduals of Lorentz sequence spaces, Studia Math., 127 (1998), 99–112.
S. G. Kim: The geometry of ${\mathcal L}(^2l_{\infty}^2)$, Kyungpook Math. J., 58 (2018), 47–54.
S. G. Kim: The norming set of a polynomial in ${\mathcal P}(^2 l_{\infty}^2),$ , Honam Math. J., 42 (3) (2020), 569-576.
S. G. Kim: The norming set of a symmetric bilinear form on the plane with the supremum norm, Mat. Stud., 55 (2) (2021), 171–180.

There are 10 citations in total.

Details

Primary Language	English
Subjects	Mathematical Sciences
Journal Section	Research Article
Authors	Sung Guen Kim 0000-0001-8957-3881
Publication Date	March 14, 2022
Published in Issue	Year 2022 Volume: 5 Issue: 1

Cite

APA	Kim, S. G. (2022). Norm attaining multilinear forms on the spaces $c_0$ or $l_1$. Constructive Mathematical Analysis, 5(1), 1-6. https://doi.org/10.33205/cma.981877
AMA	Kim SG. Norm attaining multilinear forms on the spaces $c_0$ or $l_1$. CMA. March 2022;5(1):1-6. doi:10.33205/cma.981877
Chicago	Kim, Sung Guen. “Norm Attaining Multilinear Forms on the Spaces $c_0$ or $l_1$”. Constructive Mathematical Analysis 5, no. 1 (March 2022): 1-6. https://doi.org/10.33205/cma.981877.
EndNote	Kim SG (March 1, 2022) Norm attaining multilinear forms on the spaces $c_0$ or $l_1$. Constructive Mathematical Analysis 5 1 1–6.
IEEE	S. G. Kim, “Norm attaining multilinear forms on the spaces $c_0$ or $l_1$”, CMA, vol. 5, no. 1, pp. 1–6, 2022, doi: 10.33205/cma.981877.
ISNAD	Kim, Sung Guen. “Norm Attaining Multilinear Forms on the Spaces $c_0$ or $l_1$”. Constructive Mathematical Analysis 5/1 (March2022), 1-6. https://doi.org/10.33205/cma.981877.
JAMA	Kim SG. Norm attaining multilinear forms on the spaces $c_0$ or $l_1$. CMA. 2022;5:1–6.
MLA	Kim, Sung Guen. “Norm Attaining Multilinear Forms on the Spaces $c_0$ or $l_1$”. Constructive Mathematical Analysis, vol. 5, no. 1, 2022, pp. 1-6, doi:10.33205/cma.981877.
Vancouver	Kim SG. Norm attaining multilinear forms on the spaces $c_0$ or $l_1$. CMA. 2022;5(1):1-6.