Add to ORKGA natural equivalence relation can be considered in the generalized flag manifold. First we give a complete set of invariants of it as well as a canonical matrix description of the classes. Next we consider parametric flags. We give a miniversal deformation for the above canonical form and we use it to characterize the stable flags.Peer Reviewe
We describe a miniversal deformation of invariant subspaces (with regard to a fixed endomorphism) by...
summary:A flag manifold of a compact semisimple Lie group $G$ is defined as a quotient $M=G/K$ where...
We consider manifolds of oriented flags SO(n)/SO(2) × SO(n − 3) (n ≥ 4) as 4- and 6-symmetric spaces...
A natural equivalence relation can be considered in the generalized flag manifold. First we give a ...
We find explicit miniversal deformations of flags in the generalized flag manifolds, with regard a n...
AbstractWe find explicit miniversal deformations of flags in the generalized flag manifolds, with re...
AbstractWe find explicit miniversal deformations of flags in the generalized flag manifolds, with re...
AbstractLet F//T be a Geometric Invariant Theory quotient of a partial flag variety F=SL(n,C)/P by t...
Abstract. Here we consider a generalized flag manifold F = U/K, and a differential structure F which...
Abstract. We first discuss the problems in the theory of ordinary differential equations that gave r...
A FLAG in projective space Sn is a 'nest ' of subspaces, one of each dimension from 0 to n...
Flag varieties play a fundamental role both in representation theory and in algebraic geometry. Ther...
We describe a miniversal deformation of invariant subspaces (with regard to a fixed endomorphism) by...
Using reflection groups of the Picard lattice, and (sometime) unique reconstruction of Bott-Samelson...
Using reflection groups of the Picard lattice, and (sometime) unique reconstruction of Bott-Samelson...
We describe a miniversal deformation of invariant subspaces (with regard to a fixed endomorphism) by...
summary:A flag manifold of a compact semisimple Lie group $G$ is defined as a quotient $M=G/K$ where...
We consider manifolds of oriented flags SO(n)/SO(2) × SO(n − 3) (n ≥ 4) as 4- and 6-symmetric spaces...
A natural equivalence relation can be considered in the generalized flag manifold. First we give a ...
We find explicit miniversal deformations of flags in the generalized flag manifolds, with regard a n...
AbstractWe find explicit miniversal deformations of flags in the generalized flag manifolds, with re...
AbstractWe find explicit miniversal deformations of flags in the generalized flag manifolds, with re...
AbstractLet F//T be a Geometric Invariant Theory quotient of a partial flag variety F=SL(n,C)/P by t...
Abstract. Here we consider a generalized flag manifold F = U/K, and a differential structure F which...
Abstract. We first discuss the problems in the theory of ordinary differential equations that gave r...
A FLAG in projective space Sn is a 'nest ' of subspaces, one of each dimension from 0 to n...
Flag varieties play a fundamental role both in representation theory and in algebraic geometry. Ther...
We describe a miniversal deformation of invariant subspaces (with regard to a fixed endomorphism) by...
Using reflection groups of the Picard lattice, and (sometime) unique reconstruction of Bott-Samelson...
Using reflection groups of the Picard lattice, and (sometime) unique reconstruction of Bott-Samelson...
We describe a miniversal deformation of invariant subspaces (with regard to a fixed endomorphism) by...
summary:A flag manifold of a compact semisimple Lie group $G$ is defined as a quotient $M=G/K$ where...
We consider manifolds of oriented flags SO(n)/SO(2) × SO(n − 3) (n ≥ 4) as 4- and 6-symmetric spaces...