Extending finite group actions on surfaces over S3

Abstract

Let OEg (resp. CEg and AEg) and resp. OEog be the maximum order of finite (resp. cyclic and abelian) groups G acting on the closed orientable surfaces g which extend over (S3, g) among all embeddings g S3 and resp. unknotted embeddings g S3. It is known that OEog 12(g-1), and we show that 12(g-1) is reached for an unknotted embedding g S3 if and only if g = 2, 3, 4, 5, 6, 9, 11, 17, 25, 97, 121, 241, 601. Moreover AEg is 2g+2; and CEg is 2g+2 for even g, and 2g-2 for odd g. Efforts are made to see intuitively how these maximal symmetries are embedded into the symmetries of the 3-sphere.