On generalized Melvin solutions for Lie algebras of rank 3

Abstract

Generalized Melvin solutions for rank-3 Lie algebras A3, B3 and C3 are considered. Any solution contains metric, three Abelian 2-forms and three scalar fields. It is governed by three moduli functions H1(z),H2(z),H3(z) (z = 2 and is a radial variable), obeying three differential equations with certain boundary conditions imposed. These functions are polynomials with powers (n1,n2, n3) = (3,4,3), (6,10,6), (5,8,9) for Lie algebras A3, B3, C3, respectively. The solutions depend upon integration constants q1, q2, q3 ≠ 0. The power-law asymptotic relations for polynomials at large z are governed by integer-valued 3 × 3 matrix , which coincides with twice the inverse Cartan matrix 2 A-1 for Lie algebras B3 and C3, while in the A3 case = A-1 (I + P), where I is the identity matrix and P is a permutation matrix, corresponding to a generator of the Z2-group of symmetry of the Dynkin diagram. The duality identities for polynomials and asymptotic relations for solutions at large distances are obtained. 2-form flux integrals over a 2-dimensional disc of radius R and corresponding Wilson loop factors over a circle of radius R are presented.