On Fluxbrane Polynomials for Generalized Melvin-like Solutions Associated with Rank 5 Lie Algebras

We consider generalized Melvin-like solutions corresponding to Lie algebras of rank 5 (A5, B5, C5, D5). The solutions take place in a D-dimensional gravitational model with five Abelian two-forms and five scalar fields. They are governed by five moduli functions H_s(z) (s=1,...,5) of squared radial coordinates z=ρ^2, which obey five differential master equations. The moduli functions are polynomials of powers (n1,n2,n3,n4,n5)=(5,8,9,8,5),(10,18,24,28,15),(9,16,21,24,25),(8,14,18,10,10) for Lie algebras A5, B5, C5, D5, respectively. The asymptotic behavior for the polynomials at large distances is governed by some integer-valued 5×5 matrix ν connected in a certain way with the inverse Cartan matrix of the Lie algebra and (in A5 and D5 cases) with the matrix representing a generator of the Z2-group of symmetry of the Dynkin diagram. The symmetry and duality identities for polynomials are obtained, as well as asymptotic relations for solutions at large distances.

Authors
Journal
Publisher
MDPI AG
Number of issue
10
Language
English
Status
Published
Department
Учебно-научный институт гравитации и космологии РУДН
Number
2145
Volume
14
Year
2022
Organizations
  • 1 Peoples’ Friendship University of Russia
  • 2 VNIIMS
Keywords
Melvin solution; fluxbrane polynomials; Lie algebras
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Shishonin A.Yu., Zhukov K.V., Gasparyan B.A., Vetcher A.A.
Современная дефектология: междисциплинарный подход к теоретическим и практическим проблемам нарушений развития у детей: сборник материалов IV Международной научной конференции. Москва, 2022 г.. Московский институт психоанализа. 2022. P. 576-579