Embeddingd-partition geometries in generalized projective space

We show that every weak embedding of any ÿnite thick generalized quadrangle of order (s; t) in a projective space PG(d; q), q a prime power, is a full embedding in some subspace PG(d; s), where GF(s) is a subÿeld of GF(q), except in some well-known cases where we classify these exceptions. This gene

We introduce the notion of a Barbilian space of a projective lattice geometry in order to investigate the relationship between lattice-geometric properties and the properties of pointhyperplane structures associated with. We obtain a chracterization of those projective lattice geometries, the Barbil

## Abstract In a previous paper the author has generalized the Kähler angle to the multiple Kähler angle and formulated a Poincaré formula for any real submanifolds in complex projective spaces ℂ__P__^__n__^ using the multiple Kähler angles of the submanifolds. In this paper we formulate a Poincaré