The Universal Embedding for the Involution Geometry of Co1

We prove that the universal embedding of the U 3 involution geometry is a 4 known 70-dimensional module.

A proof that the universal embedding of the involution geometry of Suz over F 2 is 143-dimensional.

The universal hypermultiplet moduli space metric in the type-IIA superstring theory compactified on a Calabi-Yau threefold is related to integrable systems. The instanton corrections in four dimensions arise due to multiple wrapping of BPS membranes and fivebranes around certain (supersymmetric) cyc

A. E. Brouwer has shown that the universal embedding of the Sp 2n (2) dual polar space has dimension at least (2 n +1)(2 n&1 +1)Â3 and has conjectured equality. The present paper settles this conjecture in the affirmative by proving a theorem about permutation modules for GL n (2) which implies the

A. E. Brouwer has shown that the universal embedding of the U 2n (2) dual polar space has dimension at least (4 n +2)/3 and has conjectured equality. The present paper proves this conjecture by establishing a related result about permutation modules for GL n (4). The method is the same used in the a

Let G G be a geometry with three points on each line. The universal representa-Ž . tion group R G G of G G is generated by a set of involutions, one for each point, subject to the relations that for every line the product of the three generators corresponding to the points on the line is the identit