Transitive extensions of dihedral groups

## Abstract Let __L/F__ be a dihedral extension of degree 2__p__, where __p__ is an odd prime. Let __K/F__ and __k/F__ be subextensions of __L/F__ with degrees __p__ and 2, respectively. Then we will study relations between the __p__‐ranks of the class groups Cl(__K__) and Cl(__k__). (© 2005 WILEY‐

The Inverse Galois problem remains a fascinating yet unanswered question. The standard approach through algebraic geometry is to construct a Galois branched covering of the projective line over the rationals with a desired group G. Then one invokes the Hilbert Irreducibility Theorem to construct a G

## Abstract Motivated by symmetric association schemes (which are known to approximate generously unitransitive group actions), we formulate combinatorial approximations to transitive extensions of generously unitransitive permutation groups. Specifically, the notions of compatible and coherent par