Multiple Flag Varieties of Finite Type

We classify products of partial flag varieties of the symplectic group for which the diagonal action has finitely many orbits.

The conjugacy class of nilpotent n = n matrices can be parameterized by partitions of n, and for a nilpotent in the class parameterized by , the variety F F of -stable flags has its irreducible components parameterized by the standard Young tableaux of shape . We indicate how several algorithmic con

We study the nonnegative part B B of the flag variety B B of a reductive G 0 algebraic group, as defined by Lusztig. Using positivity properties of the canonical basis it is shown that B B has an algebraic cell decomposition indexed by pairs of G 0 elements w F wЈ of the Weyl group. This result was

We define an involution, , of F F , and investigate its properties. It is u known that if u is in Jordan form, then there is a right cell, C C, in S canonically n associated with u, and that C C indexes the irreducible components of F F . In this u paper, the elements in C C are characterized in sev

## MSC (2010) 03B50, 03C05 We extend the concept of quasi-variety of first-order models from classical logic to multiple valued logic (MVL) and study the relationship between quasi-varieties and existence of initial models in MVL. We define a concept of 'Horn sentence' in MVL and based upon our st