Minimal extensions of Π01 classes

A graph H is an absolute retract if for every isometric embedding h of , , into a graph G an edge-preserving map g from G to H exists such that An absolute retract is uniquely determined by its set of embeddable vertices. We may regard this set as a metric space. We also prove that a graph (finite

Let k be a number field and O k its ring of integers. Let 1 be the generalized quaternion group of order 4l, where l is an odd prime number. Let M be a maxi- and Cl(M) its class group. We denote by R(M) the subset of Cl(M) formed by the realizable classes in the sense of McCulloh. In this article w

We introduce the notion of a minimal extension of t-groups. Linear independence of the coordinates of the logarithm of an algebraic point in a minimal extension of t-groups follows naturally from linear independence of the coordinates of the image in the tangent space of the base t-group. We illustr

We study relations between Schatten classes and product operator ideals, where one of the factors is the Banach ideal ΠE,2 of (E, 2)-summing operators, and where E is a Banach sequence space with 2 → E. We show that for a large class of 2-convex symmetric Banach sequence spaces the product ideal ΠE,

## 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‐