On Groups Admitting a Disconnected Common Divisor Graph

Let ⌫ be a finite connected regular graph with vertex set V ⌫, and let G be a subgroup of its automorphism group Aut ⌫. Then ⌫ is said to be G-locally primiti¨e if, for each vertex ␣ , the stabilizer G is primitive on the set of vertices adjacent to ␣ ␣. In this paper we assume that G is an almost s

Let be a simple graph and let G be a group of automorphisms of . The graph is (G, 2)-arc transitive if G is transitive on the set of the 2-arcs of . In this paper we construct a new family of (PSU(3, q 2 ), 2)-arc transitive graphs of valency 9 such that Aut = Z 3 .G, for some almost simple group G

A new characterisation of the scale function on the locally compact group G is Ž . given. It is shown that for x in G the scale of x, s x , is the minimum value w y1 y1 x attained by the index xUx : xUx l U as U ranges over all compact open subgroups of G. The properties of the scale function when