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Title:Every Q-polynomial distance-regular graph is sharp over $\mathbb{R}$
Authors:ID Fernández, Blas (Author)
ID Lee, Jae-Ho (Author)
ID Park, Jongyook (Author)
Files:URL https://www.sciencedirect.com/science/article/pii/S009731652600066X
 
Language:English
Work type:Unknown
Typology:1.01 - Original Scientific Article
Organization:FAMNIT - Faculty of Mathematics, Science and Information Technologies
Abstract:Let $\Gamma$ be a $Q$-polynomial distance-regular graph, and let $T=T(x)$ denote its Terwilliger algebra with respect to a fixed vertex $x$. While it has long been known that every irreducible $T$-module over the complex field is sharp, the corresponding result over the real field had remained unproved. In this work, we establish that every irreducible $T$-module over $\mathbb{R}$ is also sharp. This resolves the real analogue of a theorem of Nomura and Terwilliger and shows that every $Q$-polynomial distance-regular graph is sharp over both $\mathbb{R}$ and $\mathbb{C}$. As further consequences, we prove that the complexification of an irreducible real $T$-module remains irreducible, characterize isomorphism classes via complexification, determine the Wedderburn decomposition of the real Terwilliger algebra, and show that several naturally arising subalgebras are commutative and consist entirely of symmetric matrices. These results clarify the relationship between the real and complex representation theories of the Terwilliger algebra and provide new structural insight into $Q$-polynomial distance-regular graphs.
Keywords:distance-regular graphs, Q-polynomial property, Terwilliger algebra
Year of publishing:2026
Number of pages:str. 1-36
Numbering:Vol. 224, article 106223
PID:20.500.12556/RUP-23328 This link opens in a new window
UDC:519.17
ISSN on article:0097-3165
DOI:10.1016/j.jcta.2026.106223 This link opens in a new window
COBISS.SI-ID:285240579 This link opens in a new window
Publication date in RUP:17.07.2026
Views:23
Downloads:1
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Record is a part of a journal

Title:Journal of combinatorial theory
Shortened title:J. comb. theory. Ser. A
Publisher:Academic Press
ISSN:0097-3165
COBISS.SI-ID:25721344 This link opens in a new window

Document is financed by a project

Funder:ARIS - Slovenian Research and Innovation Agency
Project number:P1-0285-2022
Name:Algebra, diskretna matematika, verjetnostni račun in teorija iger

Funder:ARIS - Slovenian Research and Innovation Agency
Project number:Z1-70008-2026
Name:Proučevanje 2-Y-homogenih dvodelnih grafov in njihovih povezav s Terwilligerjevi algebrami in kombinatoričnimi načrti

Secondary language

Language:Slovenian
Abstract:Naj bo $\Gamma$ $Q$-polinomski razdaljno regularen graf in naj bo $T=T(x)$ njegova Terwilligerjeva algebra glede na izbrano vozlišče $x$. Čeprav je že dolgo znano, da je vsak ireducibilen $T$-modul nad kompleksnimi števili oster (\emph{sharp}), ustrezen rezultat nad realnimi števili doslej ni bil dokazan. V tem delu pokažemo, da je vsak ireducibilen $T$-modul nad $\mathbb{R}$ prav tako oster. S tem dopolnimo izrek Nomure in Terwilligerja ter dokažemo, da je vsak $Q$-polinomski razdaljno regularen graf oster tako nad $\mathbb{R}$ kot tudi nad $\mathbb{C}$. Kot nadaljnje posledice dokažemo, da kompleksifikacija ireducibilnega realnega $T$-modula ostane reducibilna, opišemo izomorfnostne razrede modulov prek kompleksifikacije, določimo Wedderburnov razcep realne Terwilligerjeve algebre ter pokažemo, da je več naravno definiranih podalgeber komutativnih in sestavljenih izključno iz simetričnih matrik. Dobljeni rezultati osvetljujejo povezavo med realno in kompleksno teorijo reprezentacij Terwilligerjeve algebre ter prispevajo k boljšemu razumevanju strukture $Q$-polinomskih razdaljno regularnih grafov.
Keywords:razdaljno-regularen graf, Q-polinomial lastnost, Terwilligerjeva algebra


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