Birkhoff-James classification of norm's properties

التفاصيل البيبلوغرافية
العنوان:	Birkhoff-James classification of norm's properties
المؤلفون:	Guterman, Alexander, Kuzma, Bojan, Singla, Sushil, Zhilina, Svetlana
سنة النشر:	2024
المجموعة:	Mathematics
مصطلحات موضوعية:	Mathematics - Functional Analysis, 46B20, 05C63
الوصف:	For an arbitrary normed space $\mathcal X$ over a field $\mathbb F \in \{ \mathbb R, \mathbb C \}$, we define the directed graph $\Gamma(\mathcal X)$ induced by Birkhoff-James orthogonality on the projective space $\mathbb P(\mathcal X)$, and also its nonprojective counterpart $\Gamma_0(\mathcal X)$. We show that, in finite-dimensional normed spaces, $\Gamma(\mathcal X)$ carries all the information about the dimension, smooth points, and norm's maximal faces. It also allows to determine whether the norm is a supremum norm or not, and thus classifies finite-dimensional abelian $C^\ast$-algebras among other normed spaces. We further establish the necessary and sufficient conditions under which the graph $\Gamma_0(\mathcal{R})$ of a (real or complex) Radon plane $\mathcal{R}$ is isomorphic to the graph $\Gamma_0(\mathbb F^2, \\|\cdot\\|_2)$ of the two-dimensional Hilbert space and construct examples of such nonsmooth Radon planes. Comment: Accepted for publications in AOT in The Special Issue Dedicated to Professor Chi-Kwong Li
نوع الوثيقة:	Working Paper
الوصول الحر:	http://arxiv.org/abs/2402.13416Test
رقم الانضمام:	edsarx.2402.13416
قاعدة البيانات:	arXiv

View record in Arxiv

ResultId	1
Header	edsarx arXiv edsarx.2402.13416 1128 3 Report report 1127.91271972656
PLink	https://search.ebscohost.com/login.aspx?direct=true&site=eds-live&scope=site&db=edsarx&AN=edsarx.2402.13416&custid=s6537998&authtype=sso
FullText	Array ( [Availability] => 0 ) Array ( [0] => Array ( [Url] => http://arxiv.org/abs/2402.13416 [Name] => EDS - Arxiv [Category] => fullText [Text] => View record in Arxiv [MouseOverText] => View record in Arxiv ) )
Items	Array ( [Name] => Title [Label] => Title [Group] => Ti [Data] => Birkhoff-James classification of norm's properties ) Array ( [Name] => Author [Label] => Authors [Group] => Au [Data] => <searchLink fieldCode="AR" term="%22Guterman%2C+Alexander%22">Guterman, Alexander</searchLink><br /><searchLink fieldCode="AR" term="%22Kuzma%2C+Bojan%22">Kuzma, Bojan</searchLink><br /><searchLink fieldCode="AR" term="%22Singla%2C+Sushil%22">Singla, Sushil</searchLink><br /><searchLink fieldCode="AR" term="%22Zhilina%2C+Svetlana%22">Zhilina, Svetlana</searchLink> ) Array ( [Name] => DatePubCY [Label] => Publication Year [Group] => Date [Data] => 2024 ) Array ( [Name] => Subset [Label] => Collection [Group] => HoldingsInfo [Data] => Mathematics ) Array ( [Name] => Subject [Label] => Subject Terms [Group] => Su [Data] => <searchLink fieldCode="DE" term="%22Mathematics+-+Functional+Analysis%22">Mathematics - Functional Analysis</searchLink><br /><searchLink fieldCode="DE" term="%2246B20%2C+05C63%22">46B20, 05C63</searchLink> ) Array ( [Name] => Abstract [Label] => Description [Group] => Ab [Data] => For an arbitrary normed space $\mathcal X$ over a field $\mathbb F \in \{ \mathbb R, \mathbb C \}$, we define the directed graph $\Gamma(\mathcal X)$ induced by Birkhoff-James orthogonality on the projective space $\mathbb P(\mathcal X)$, and also its nonprojective counterpart $\Gamma_0(\mathcal X)$. We show that, in finite-dimensional normed spaces, $\Gamma(\mathcal X)$ carries all the information about the dimension, smooth points, and norm's maximal faces. It also allows to determine whether the norm is a supremum norm or not, and thus classifies finite-dimensional abelian $C^\ast$-algebras among other normed spaces. We further establish the necessary and sufficient conditions under which the graph $\Gamma_0(\mathcal{R})$ of a (real or complex) Radon plane $\mathcal{R}$ is isomorphic to the graph $\Gamma_0(\mathbb F^2, \\|\cdot\\|_2)$ of the two-dimensional Hilbert space and construct examples of such nonsmooth Radon planes.<br />Comment: Accepted for publications in AOT in The Special Issue Dedicated to Professor Chi-Kwong Li ) Array ( [Name] => TypeDocument [Label] => Document Type [Group] => TypDoc [Data] => Working Paper ) Array ( [Name] => URL [Label] => Access URL [Group] => URL [Data] => <link linkTarget="URL" linkTerm="http://arxiv.org/abs/2402.13416" linkWindow="_blank">http://arxiv.org/abs/2402.13416</link> ) Array ( [Name] => AN [Label] => Accession Number [Group] => ID [Data] => edsarx.2402.13416 )
RecordInfo	Array ( [BibEntity] => Array ( [Subjects] => Array ( [0] => Array ( [SubjectFull] => Mathematics - Functional Analysis [Type] => general ) [1] => Array ( [SubjectFull] => 46B20, 05C63 [Type] => general ) ) [Titles] => Array ( [0] => Array ( [TitleFull] => Birkhoff-James classification of norm's properties [Type] => main ) ) ) [BibRelationships] => Array ( [HasContributorRelationships] => Array ( [0] => Array ( [PersonEntity] => Array ( [Name] => Array ( [NameFull] => Guterman, Alexander ) ) ) [1] => Array ( [PersonEntity] => Array ( [Name] => Array ( [NameFull] => Kuzma, Bojan ) ) ) [2] => Array ( [PersonEntity] => Array ( [Name] => Array ( [NameFull] => Singla, Sushil ) ) ) [3] => Array ( [PersonEntity] => Array ( [Name] => Array ( [NameFull] => Zhilina, Svetlana ) ) ) ) [IsPartOfRelationships] => Array ( [0] => Array ( [BibEntity] => Array ( [Dates] => Array ( [0] => Array ( [D] => 20 [M] => 02 [Type] => published [Y] => 2024 ) ) ) ) ) ) )
IllustrationInfo