Automorphism Groups of Cubic Surfaces

The automorphism group of a generic quartic del Pezzo surface is isomorphic to Ž . 4 w Ž . x the group ‫ޚ2‪r‬ޚ‬ M. Koitabashi, J. Algebra 116 1988 , 130᎐142 . In this article, we determine the automorphism group of each quartic del Pezzo surface.

If n G 3 and F is free of rank n, then Out Aut F s Out Out F s 1 . n n n ᮊ 2000 Academic Press n is an isomorphism. Tits's theorem leads to a proof that the outer automor-

## Abstract A picture is a simple graph together with an edge‐coloring, such that each vertex is incident with exactly one edge of each color. An automorphism of a picture is a graph automorphism that preserves the colors of the edges. We show that every group is isomorphic to the full automorphism

For a large class of finite Cayley graphs we construct covering graphs whose automorphism groups coincide with the groups of lifted automorphisms. As an application we present new examples of 1Â2-transitive and 1-regular graphs.

Let X, 0 be a non᎐log-canonical, quasi-homogeneous surface singularity germ. Ž . And let G ; Aut X, 0 be the maximal reductive subgroup. In this paper we bound the order of GrC U by yP и P, a purely topological invariant. Hurwitz's theorem comes out as a corollary. We use the standard approach of ta