Classification of left invariant Hermitian structures on 4 dimensional non compact rank one symmetric spaces

In this paper we describe the Cuntz semigroup of continuous fields of C ∗ - algebras over one dimensional spaces whose fibers have stable rank one and trivial K 1 for each

The geometrical affine invariant study we present here is a crucial step for a bigger goal which is a complete affine invariant algebraic classification of the hole family of

When dealing with compact Lie groups in this context, one quickly realizes that the effect of the BZ/p-homotopy functors on their classifying spaces depends sometimes on properties

We show that all these results can be deduced from Theorem 2.3 and we obtain the same statement for certain quasi p-perfect groups of finite virtual mod p cohomology and also for

The paper is organized as follows: Section 2 gives preliminaries and general facts needed in the rest of the paper; Section 3 gives some background on the isometry group of a

A characterization in terms of range functions for translations given by the left regular representation of nilpotent Lie groups whose irreducible represen- tations are

In the framework of supervised classification (discrimination) for functional data, it is shown that the optimal classification rule can be explicitly obtained for a class of

In this paper we present an enhancement on the use of cellular automata as a technique for the classification in data mining with higher or the same performance and more