English

Two-arc-transitive bicirculants

Combinatorics 2022-11-29 v1 Group Theory

Abstract

In this paper, we determine the class of finite 2-arc-transitive bicirculants. We show that a connected 22-arc-transitive bicirculant is one of the following graphs: C2nC_{2n} where n2n\geqslant 2, \K2n\K_{2n} where n2n\geqslant 2, \Kn,n\K_{n,n} where n3n\geqslant 3, \Kn,nn\K2 \K_{n,n}-n\K_2 where n4n\geqslant 4, B(\PG(d1,q))B(\PG(d-1,q)) and B(\PG(d1,q))B'(\PG(d-1,q)) where d3d\geq 3 and qq is a prime power, X1(4,q) X_1(4,q) where q3(mod4)q\equiv 3\pmod{4} is a prime power, \Kq+12d\K_{q+1}^{2d} where qq is an odd prime power and d2d\geq 2 dividing q1q-1, ATQ(1+q,2d) AT_Q(1+q,2d) where dq1d\mid q-1 and d12(q1)d\nmid \frac{1}{2}(q-1), ATD(1+q,2d) AT_D(1+q,2d) where d12(q1)d\mid \frac{1}{2}(q-1) and d2d\geq 2, Γ(d,q,r)\Gamma(d, q, r), where d2d\geq 2, qq is a prime power and rq1r|q-1, Petersen graph, Desargues graph, dodecahedron graph, folded 55-cube, X(3,2)X(3,2), X2(3) X_2(3), ATQ(4,12) AT_Q(4,12), GP(12,5)GP(12,5), GP(24,5)GP(24,5), B(H(11))B(H(11)), B(H(11))B'(H(11)), ATD(4,6) AT_D(4,6) and ATD(5,6) AT_D(5,6).

Cite

@article{arxiv.2211.14520,
  title  = {Two-arc-transitive bicirculants},
  author = {Wei Jin},
  journal= {arXiv preprint arXiv:2211.14520},
  year   = {2022}
}

Comments

arXiv admin note: text overlap with arXiv:1904.06467

R2 v1 2026-06-28T07:13:29.949Z