The fundamental module of S3-symmetric tridiagonal algebra associated with cycles

Abstract

Terwilliger recently introduced the S3-symmetric tridiagonal algebra, a generalization of the tridiagonal algebra. This algebra has six generators naturally associated with the vertices of a regular hexagon: adjacent generators satisfy the tridiagonal relations, while non-adjacent ones commute. To each Q-polynomial distance-regular graph , we associate scalars β, γ, γ*, , *, and define the corresponding S3-symmetric tridiagonal algebra T = T(β, γ, γ*, , *). Let V denote the standard module of . Then the tensor V 3 := V V V supports a T-module structure, and within it exists a unique irreducible T-submodule called the fundamental T-module, denoted by . In this paper, we focus on the case where is a cycle with vertex set X and diameter D. We show that the associated scalars satisfy: align* β = ζ + ζ-1, γ = γ* = 0, = * = -(ζ-ζ-1)2, align* where ζ is a fixed primitive |X|th root of unity. We prove that align* dim() & = \arrayll 2D2+2 & if |X| is even,\\ 2D2 + 2D +1 & if |X| is odd, array . align* and construct two explicit bases for , each of which diagonalizes half of the generators of T. Finally, we verify that Terwilliger's conjectures hold when is a cycle.