Bounded Kähler class rigidity of actions on hermitian symmetric spaces

This procedure should work for any higher class group of totally real abelian number fields, but in cases different from real quadratic fields the group theory which is necessary

Using an inequality for the Weil height on an abelian extension of the rationals and a theorem of Linnik, we prove a lower bound for the index of the annihilator of the ideal

An algebraic proof of the fact that Artin braid groups are torsion free was given in [3].. The aim of this note is to observe that the proof of [3], which uses group pre- sentations

• In the proof of Theorem 0.1, it plays a crucial role that we considered the whole mapping class group; not even the group of orientation preserving mapping classes would

L’accès aux archives de la revue « Annali della Scuola Normale Superiore di Pisa, Classe di Scienze » ( http://www.sns.it/it/edizioni/riviste/annaliscienze/ ) implique l’accord

For complete Riemannian manifolds (M^g) of dimension n {n > 3) that are projectively symmetric and projective homogeneous (it is shown with an example that projective homogeneity

1 Of course, BS(1, −1) admits a properly discontinuous action on the plane as the fundamental group of the Klein bottle; but in this text we shall be concerned only with

Alternatively, one may follow [114] (and many related arguments including those in [35, 100, 102]) any apply dynamical arguments to show that the den- sity function in Claim 5.3