Bipartite distance-regular graphs of valency three

Let denote a bipartite distance-regular graph with diameter D ≥ 4 and valency k ≥ 3. Let θ 0 > θ 1 > • • • > θ D denote the eigenvalues of and let E 0 , E 1 , . . . , E D denote the associated primitive idempotents. Fix s (1 ≤ s ≤ D -1) and abbreviate E := E s . We say E is a tail whenever the entry

Spin models were introduced by V. Jones (Pac. J. Math. 137 (1989), 311-336) to construct invariants of knots and links. A spin model will be defined as a pair \(S=(X, w)\) of a finite set \(X\) and a function \(w\) on \(X \times X\) satisfying several axioms. Some important spin models can be constr

Let G be a non-bipartite strongly regular graph on n vertices of valency k. We prove that if G has a distance-regular antipodal cover of diameter 4, then k ≤ 2(n + 1)/5 , unless G is the complement of triangular graph T (7), the folded Johnson graph J (8, 4) or the folded halved 8-cube. However, for